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1= which is exactly like except, possibly, for the values it assigns to the variable x in the various domains. In (l957c) and (l957d) he considers the following alternative clause: (ii)
~ Vx
which is exactly like except possibly, for the value it assigns to the variable x in the domain 0. Kanger (l957c) suggests the following informal readings of these two alternatives: (xup is true iff
, we get: (EG)
q>(t/x) - :::Jxq>.
(Existential Generalization)
But, in view of (1)- (3) and the Law of Identity, the following sentences are true: (5) (6)
Phosphorus =Hesperus A -,ffi](Phosphorus = Hesperus). Hesperus =Hesperus A ffi](Hesperus =Hesperus).
So, it follows that: (7) (8)
:::Jx(x = Hesperus A -'ffi](x = Hesperus» . :::Jx(x = Hesperus A ffi](x = Hesperus».
Although unintuitive, this result is perfectly compatible with the interpretation of the quantifiers as ranging over individual concepts and of the identity symbol as designating coincidence between individual concepts. According to this interpretation, (7) and (8) mean: (7')
(8')
There is an individual concept x which actually coincides with the individual concept Hesperus but does not do so by analytical necessity. There is an individual concept x which not only happens to coincide with the individual concept Hesperus but does so by analytic necessity.
As Quine (1947) was the first to point out, however, (7) and (8) are incompatible with interpreting \Ix and :::Jx as objectual quantifiers meaning "for all objects x (in the domain D)" and "for at least one object x (in D)" and letting the identity sign stand for genuine identity between objects (in D) . Because, under this interpretation, (7) and (8) have the readings :
KANGER 'S EARLY SEMANTICS FOR MODAL LOGIC
(7")
(8/1)
There is an object with Hesperus and rus. There is an object with Hesperus and
117
x (in the actual domain D) which is identical which is not necessarily identical with Hespex (in the actual domain D) which is identical which is necessarily identical with Hesperus.
meaning that one and the same object, Hesperus, both is and is not necessarily identical with Hesperus, which is absurd. So Kanger' s semantics for quantified modal logic is incompatible with interpreting the quantifiers as ranging over actually existing individuals (as opposed to individual concepts) and at the same time interpreting = as identity between individuals. In Kanger's semantics there are no means of identifying individuals from one domain to another. In particular, the truth-values of formulas will not be affected if we make all the domains disjoint, by systematically replacing every domain D by the set: {: a ED}. In other words , set-theoretic relations between domains like inclusion, overlap and disjointness, have no semantic significance. Suppose we make the cla im: (9)
Something is such that it is the number of planets but might not have been so.
It seems reasonable to formalize this claim in quantified modal logic as : (10)
::Jx(Px f\ ..,OPx).
We cannot use any of the Kanger's quantifiers for this purpose, however. Suppose, namely, that: g(D, x)
E
I(D, P), DRoD', D =/:. D ', g(D', x) if I(D ', P).
Intuitively this means that one thing is the number of planets in the domain D and one thing or another is not the number of planets in the modal alternative D' to D. From this , we should not be able to conclude (10) . But on any of Kanger's interpretations of the universal quantifier, (10) follows . So his approach does not allow us to express the claim that one and the same object has a given property in one domain and lacks that property in another domain. Now, we might ask how we could repair Kanger's semantics in order to allow for genuine quantification over individuals. There are many possibilities. One that is particularly straightforward technically is to adapt Kripke's (1963a) treatment of quantification to Kanger's approach. This means that we modify the notion of an assignment g in such a way that an individual variable
lIS
STEN LINDSTROM
x is assigned an object g(x) in a domain-independent way. That is, we make two changes with respect to Kanger's notion of an assignment: (i) the value g(D, x) of an individual variable x in a domain D is no longer required to be a member of D; (ii) for all domains D and D', we require that g(D, x) = g(D' , x). After these changes are made, an assignment simply becomes a function g that assigns to each variable x an object g(x). We then adopt the following evaluation clauses for the universal and existential quantifies: 0= Vx
iff /\ :3x(x = y) - q>(y/x).
Now, how should we handle individual constants within the modified Kanger semantics? An intuitively appealing approach is to assign denotations to constants in a domain-dependent way as before, but not require the denotation I(D, c) of a constant c relative to a domain D to be a member ofD. With this treatment of indi vidual constants, we cannot infer from (1=) to: (11)
Phosphorus = Hesperus ([E](Phosphorus = Phosphorus) -[E](Phosphorus = Hesperus)),
KANGER 'S EARLY SEMANTICS FOR MODAL LOGIC
119
unless the following requirements are met: ::lxlEJ(x = Phosphorus),
::lxlEJ(x = Hesperus).
But these conditions hold , only if: ::lxlEJ(x = Phosphorus),
IEJ(Phosphorus
=Hesperus).
The last of these conditions contradicts (3), so it cannot be assumed. It would, presumably, hold only if "Phosphorus" and "Hesperus" were synonymous. Hence, we cannot infer (11) from (1=). We can also verify, directly, that the modified semantics does not allow the inference from (2) and (3) to (4) . So the Morning Star paradox, in the form that Kanger presented it, is resolved. Let us say that a modal operator 0 is a constant assignment operator, if there exists a binary relation Ro between Kanger models , such that for every assignment g, 0= O
O ( ~x) ( ~y)R.xy .
The antecedent of (7) says that there is an act which ought to be followed by a punishment, that is, that a puni shable act has been performed; the consequent says that there ought to exist a punishable act , i.e., that there ought to be an act which ought to be followed by a punishment. It is clear, according to Hintikka, that the latter does not foll ow from the former; thus (5) cannot be regarded as a valid principle. Kanger' s treatment of quantification in deontic logic was in man y respects inconclusive and unsatisfactory, and he did not discu ss it at any length , but by making one of the first attempts to develop a form al semantics for first-order deontic logic he opened a door for the discu ssion of the top ic. The interpre tation of quantifie rs in modal logic, especi ally in deontic logic , continues to be a problem-ridden area. "
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RISTO HILPINEN
VI Different assumptions about the properties of the altemativeness relation used in the truth-definitions of modal sentences (for example, deontic statements) lead to different modal and deontic logics. Kanger also thought that the altemativeness relation is helpful for expressing various philosophical assumptions about the nature and justification of norms even when such assumptions do not affect the logic of normative concepts. For example, he observes that the condition
can be regarded as an expression of "moral relativism". The deontic alternatives to a given world (domain of individuals) can be regarded as "normatively perfect worlds". According to (8), what is normatively perfect relative to one domain need not be so relative to another - perhaps this can be regarded as a form of moral or normative relativism. Kanger also makes the following assumptions about the Ro-relation: (9)
(VU) (3UJRo(U ',U)
and (10)
(3 U)...,Ro( U,U).
(9) is the seriality assumption (RD) mentioned earlier; it guarantees the truth of the principle of deontic consistency, (D)
OA:J PA,
(10) expresses the assumption that Ro is non-reflexive, which means that OA does not entail A; (10) distinguishes the concept of ought (i.e., normative necessity) from alethic necessity. Kanger observes that the denial of principle (8) means that the concept of Ought can be defined by ( 11)
OA
=df.
N(Q :J A),
where N represents the concept of analytic necessity, and Q is a propositional constant; it may be thought of as stating "what morality prescribes" (Kanger 1957/1971,53). According to Kanger (1957171) , schema (11) was first put forward in his University of Stockholm thesis for the Lie. Phil. degree in 1950. 10 The idea that normative concepts can be defined in this way by means of alethic modalities goes back to G. W. Leibniz, who suggested that the obligatory (debitum) can be defined as "that which is necessary for a good man to do", and the permitted (licitum) is "what is possible for a good man to do"
STIG KANGER ON DEONTIC LOGIC
139
(Leibniz 167111930, 465). According to (11), deontic modalities can be defined in terms of a1ethic modalities and a "normative constant" Q; an equivalent proposal was made by Alan Ross Anderson (1956), who suggested that deontic logic can be reduced to alethic modal logic by means of the schema (12)
OA
"'df.
N(A
::l
S),
where S can be taken to mean that the requirements of morality have been violated or as the threat of a sanction associated to such violations. In (1957/ 1971, 54) Kanger observed that he was inclined to reject definition (11), "because some deontic propositions seem to be synthetic". But if N is not regarded as an expression for analytic or universal necessity, but as a "contingent" necessity so that N(Q ::l A) can be true at some possible worlds but not at others, this philosophical objection to (11) does not hold. VII
Kanger seemed to be interested in deontic logic mainly for the sake of its possible applications to ethical theory, social philosophy, and the philosophy of law. In the applications studied by Kanger, the concept of action and the logic of action play an important role and are intimately connected to deontic logic . Kanger represented the concept of action by a modal operator for agency, ' Do(a,p )' , where a is an agent and p is a state of affairs or an event, the result or the outcome of the action. 'Do(a ,p)' is read "a sees to it that p", In some early publications, for example, in the original 1957 version of (1957/ 1971), in Kanger (1963) and in Kanger and Kanger (1966), Kanger used the locution "a causes p" but he adopted the expression "a sees to it that p" in (1957/1971) and in later publications (1972 , 1985). The Do -operator makes it possible to distinguish the following "modes of action" with respect to a result (state of affairs or condition) p:11 (13) (i) (ii) (iii) (iv)
Do(a,p) : .,Do(a,p): Do(a,"p): .,Do(a,"p) :
a sees to it thatp, a does not see to it that p, a sees to it that »p, and a does not see to it that "p.
The combination of different modes of action with deontic concepts makes it possible to represent several types of obligation and permission and different legal or deontic relations between individuals. Consider a state of affairs involving two parties, F(a,b). According to Kanger (1957/1971, 42; Kanger and Kanger 1966, 86- 89), the Do-operator can be combined with deontic
140
RISTO HILPINEN
operators to distinguish four basic types of right, corresponding to different senses of the expression 'right' :
(R l ) (R2) (R3) (R4)
ODo(b,F(a,b» : a has the claim in relation to b that F(a,b), -,ODo(a,-,F(a,b» :; P-,Do(a ,-,F(a,b»: a has the freedom (or liberty or privilege) in relation to b that F(a,b) , -,O-,Do(a,F(a,b» :; PDo(a ,F(a,b»: a has the power in relation to b that F(a,b), O-,Do(b,-,F(a,b»: a has the immunity in relation to b that F(a,b).
(R1)-(R4) define relational concepts of right. The replacement of the state of affairs F(a,b) by -,F(a,b) yields four additional concepts of right which Kanger and Kanger (1966, 86 -87) call counter-claim (R l ' ), counter-freedom (R2'), counter-power (R3'), and counter-immunity (R4 '). Kanger and Kanger call the relations (R1)-(R4) and (Rl ')-(R4') simple types of right. The normative relationship between any two individuals a and b with respect to a state of affairs p can be characterized completely by means of the conjunctions of the eight simple types of right or their negations. There are 256 such distinct conjunctions, but according to the standard principles for 0 and certain plausible assumptions about the logic of the Do-operator," only 26 combinations of the simple types of right or their negations are logically consistent; Kanger and Kanger call these 26 relations the atomic types ofright (1966,9394). It is perhaps misleading to call these 26 relations "types of right ", because they include as their constituents negations of rights (e.g., duties and "disabilities") as well as rights (e.g., freedoms and powers): the 26 atomic types give a complete characterization of the possible legal relationships between two persons with respect to a single state of affairs . Lars Lindahl (1994, 894-895) has suggested that Kanger's theory of normative relations represents "an improvement in the theory of duties", but suffers from a number of difficulties as a theory of rights (Lindahl 1994, 896- 909). Kanger's concepts (Rl- R4) correspond to W. N. Hohfeld's (1919) account of the four ways using the word 'right' (or four concepts of a right) , and he adopted the expressions 'privilege', 'power' and 'immunity' from Hohfeld. Hohfeld (1919, 35-36) called the counterpart of Kanger's "claim" simply "right". Kanger apparently intended (R1)- (R4) as approximate explications of Hohfeld's notions. However, Kanger' s concepts of power and immunity differ from Hohfeld's concepts ." According to Kanger, the concepts of power and freedom are closely related. Both are permissions: a power consists in the permissibility of actively seeing to it that something is the case, whereas freedom means that there is no obligation to see to it that the opposite state of affairs should be the case. Lindahl (1977, 51) and many others have argued
STIG KANGER ON DEONTIC LOGIC
141
that Hohfeld's concept of power should be analyzed as a legal ability rather than a permission (i.e., a can rather than may). (See Lindahl 1994,898-899, Bulygin 1992, Makinson 1986,408-409.) However, it is clear that Kanger's way of combining deontic operators with operators for agency provided useful conceptual tools for the analysis of legal relations . It enabled him and Helle Kanger to develop a rich theory of normative relations which found interesting applications in the study of governmental position structures, different forms of parliamentarism, and human rights (Kanger and Kanger 1966, Helle Kanger 1984), and formed a good basis for further research in this area (Lindahl 1977, 1994).
VIII In his 1957 paper (1957/1971) Kanger did not say much about the interpretation of the Do-operator, but in (1972) he presented an interesting analysis of the concept of seeing to it that p: A statement of the form Do(a,p) is regarded as a conjunction (CDO) Do(a,p)
'=
Dn(a,p) & Ds(a,p),
where 'Ds' may be said to represent the sufficient condition aspect of agency and 'Dn' the necessary condition aspect of agency. Kanger used the expression 'D6' for the sufficient condition aspect of agency (Ds), and 'Do' for the necessary condition aspect of agency (Dn); he read 'Ds(a,p)' as p is necessary for something a does,
and 'Dn(a,p)' as p is sufficient for something a does.
These readings are equivalent to
(14)
Ds(a,p): Something a does is sufficient for p,
and
(15)
Dn(a,p): Something a does is necessary for p.
Kanger interpreted Ds and Dn in terms of two alternativeness relations on possible worlds : (CDS)
u ~ Ds(a,p) if and only if w~ p for every w such that Sos(w,u),
and (CDN) u ~ Dn(a,p) if and only if w~"'p for every w such that SON(W,U).
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RISTO HILPINEN
To simplify this presentation, I am using here the standard possible worlds notation, not Kanger' s notation of primary valuations and domains. The words W such that SDS(W,U) can be regarded as worlds in which the agent a performs the same actions as in u. Kanger takes 'SDN(W,V)' to mean that "the opposite" of everything a does in u is the case in W (Kanger 1972, 121). It is not quite clear what this means. One possible interpretation is that a does not do any of the things she does in u, but for example is completely passive (insofar as this is possible) or, for any action B that a performs at u, she does something else (i.e., some action alternative to B) at w. Kanger's analysis of the concept of agency has a form which has become widely accepted in the recent work on the logic of agency. The first condition of agency, the Ds-condition, may be termed the positive condition, and the second condition, the On-condition, may be termed the negative condition of agency." The negative condition may also be termed the counterfactual condition of agency: it states that if the agent had not acted the way he did, p would not have been the case . G. H. von Wright presented an analysis of this kind in the his work Norm and Action (1963), but his logic of action and agency was otherwise quite different from Kanger's. (For discussions of von Wright's theory, see Segerberg 1992, 351- 359, and Hilpinen 1997a, 5-10; 1997b, 84-91.) Other versions of the analysis of agency by means of a positive and a negative condition have been presented by Ingmar Porn (1974, 1977), who was directly influenced by Kanger's work, Lennart Aqvist (1974) , Aqvist and Mullock (1989), and more recently by Nuel Belnap and his associates (Belnap 1991, Belnap and Perloff 1990,1992, Horty and Belnap 1995, Perloff 1991; for a review of these proposals, see Hilpinen 1997a, 1997b). Philosophers have disagreed about the formulation of the negative condition. Ingmar Porn (1974, 1977) has argued that we should accept instead of Kanger's Oncondition only a weaker negative requirement, viz. '--,Dn(a,-.p)' , abbreviated here 'C n(a,p )' : (ACN) u pCn(a,p) if and only if W P--'p for some w such that SDN(W,U). This condition can be read: but for a's action it might not have been the case that p (Porn 1974, 96; 1977, 7). This means that it is not unavoidable for a that p. Lennart Aqvist (1974, 86) has accepted a similar weak form of the counterfactual condition. According to Porn and Aqvist, the negative condition should be formulated as a might-statement or a might-conditional, not as a would-eonditional. Porn has defended the weak negative cond ition on the ground that if the concept of agency is defined in terms of (COO), then the following conjunction is logically inconsistent:
STIG KANGER ON DEONTIC LOGIC
(16)
143
Do(P) & Do(p :::> q);
according to Kanger's conditions (CDS) and (CDN), Do(p :::> q) entails ...,Do(p). (Porn gives credit for this observation to Andrew J. I. Jones ; cf. Porn 1977,7.) In other words, 'a sees to it that p :::> q' is inconsistent with'a sees to it that p' . According to Porn, there are many action situations which can be adequately described by means of consistent conjunctions of the form (16). However, the usual sine qua non test of causal dependence as a condition of agency is usually expressed by a would-conditional rather than by a might-conditional (Hart and Honore 1959, 104-108), that is, by means of a strong negative condition. There are strong presystematic grounds for favoring a wouldconditional.
IX As I mentioned above, Kanger's characterization of the negative condition suggests that it refers to situations in which the agent is passive" or in which the agent performs none of the actions she performs in the actual situation. It is not clear how the second characterization could be satisfied, and it is easy to see that the interpretation of the negative condition as passivity does not always give the right results . Let us consider a situation u in which a person - call her Elsie - is in a room which is too warm; the door is closed and there is a cat in the room. Assume Elsie wants to cool the room . She can do this by opening the door; however, if she opens the door, the cat will run out unless she restrains the cat. Elsie wants the cat to remain inside . Let us adopt the following abbreviations: r =The room is cooled. s =The cat remains inside. D = (the action of) opening the door, C = (the action of) restraining the cat.
Elsie wishes to see to it that the room is cooled and that the cat remains inside. She performs an action - opening the door (D) - which guarantees or necessitates the result r and anothe r action, restraining the cat (C), which ensures the result s. Thus we can say that Elsie sees to it that the room is cooled and sees to it that the cat remains inside. It is also natural to say that by restraining the cat while opening the door , Elsie sees to it that if the door is opened, the cat will remain inside. Thus the following sentences seem true in this situation:
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RISTO HILPINEN
(17) (i) Do(e, r), (ii) Do(e, s), and (iii) Do(e, If r . then s). However, according to Kanger's version of the negative condition, (17.ii) is not true, because in the situations in which "the opposite of everything" Elsie does at u is the case, the cat will remain inside: in such situations Elsie neither opens the door nor restrains the cat. In this respect Porn's weak negative condition does not work much better, because we may assume that the cat remains inside in all situations in which Elsie performs neither D nor C, that is, "does not do any of the things she does in a given situation"; Porn (1977, 5). It is nevertheless clear that C is in circumstances u a sine qua non condition and in that sense a necessary condition of the result s: the following counterfactu al is true: (18)
If Elsie had not restrained the cat, he would not have remained inside.
(18) cannot be understood as a strict conditional ; it is a variably strict conditional: it should be taken to mean that the cat would not remain inside but would escape in the situations in which Elsie does not restrain him, but which are otherwise maximally similar to the actual situation; in such situations Elsie opens the door and cools the room just as in the actual situation . The negative condit ion of agency should be formulated as a counterfactual conditional like the following where the corresponding concept of agency is expressed by 'Do*' : (19)
up Do*(a,p) only if a performs at usome action B such that if a had not done B, p would not have been the case .
In fact, (19) corresponds reasonably well to Kanger's intuitive reading of the Do-operator. 16 This version of the negative condition agrees with the ordinary sine qua non interpretation of agent causation. As was stated above, the conditional used in (19) should be regarded as a variably strict conditional whose truth-conditions can be analyzed for example in accordance with the possible worlds semantics of counterfactuals developed by David Lewis (1973 ). It must be recognized, of course , that the semantical theories of counterfactuals were only being developed when Kanger was working on the semantics of his Do-operator. What about the conditional 'if r, then s' in the example given above - can we say that Elsie brings it about that this conditional is true? Let us assume that it can be construed as a material conditional ' -y V s' , Does Elsie do something which is necessary for the truth ofthis disjunction? Given that Elsie
STIG KANGER ON DEONTIC LOGIC
145
restrains the cat, can we also say that she performs the disjunctive action of not opening the door or restraining the cat ? If this is regarded as an action performed by Elsie, then there is an action (performed by Elsie) which is necessary for or V s, because the following counterfactual is true: (20)
If Elsie had not performed the action »D V C, it would not have been the case that or V s.
Insofar as (20) makes sense and can be regarded as true, the Jones-Porn objection to the modified (counterfactual) formulation of the strong negative condition of agency fails. It seems possible that the performance of a certain action in a given situation is necessary for p (e.g. , for that there is a fire) , and the performance of another action in the same situation is necessary for 0p V q (e.g., for that if there is a fire, a fire brigade will arrive), but the same action cannot be the conditio sine qua non of both states of affairs. There is no doubt that in some contexts the concept of agency (or agent causation) requires a strong negative (counterfactual) condition. However, in the analysis of the concept of seeing to it that p such a condition is questionable. For example, Lars Lindahl (1977 , 70) has observed that the expression 'x sees to it that p' can characterize merely an intention or preparedness to act in order to sustain the state of affairs p; in such circumstances the counterfactual condition as formulated above, need not hold .'? Brian Chellas (1992,515) has argued that the negative condition "does not form a proper part of the meaning of sees to it that" ; according to Chellas, assertions of agency using the expression "sees to it that" may carry an implication of "seeing to it really", but this does not justify making "a negative stipulation intrinsic to the meaning of this idiom" (ibid.). In this respect 'x sees to it that p' differs from 'x brings it about that p' or the expression used by Kanger in his early writings, 'x causes p '; the latter two usually indicate a causal dependence of the result p on the agent's actions, and thus their meaning should include a strong negative (i.e ., counterfactual) condition. The concept of seeing to it that p suggests a strong positi ve (or "necessitating") condition, whereas the concept of bringing it about involves a strong negative condition but only a weak positive condition, since one can bring things about (e.g., cause events) by accident or through coincidences." It may be observed that the applications of de ontic logic and the logic of action in which Kanger was interested, for example, the analysis of different concepts of right, are not sensitive to slight shifts in the interpretation of the Do-operator. In the logic of action, as in many other areas of philosophical logic, Kanger's pioneering work gave rise to interesting conceptual questions and
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RISTO HILPINEN
stimulated a great deal of new research in the field. 19 His way of combining the logic of action with deontic logic extended the applicability of deontic logic far beyond the traditional questions about the logic and interpretation of mandatory and permissive norms. University ofMiami (Coral Gables)
NOTES The paper appeared first as a privately distributed booklet which circulated widely among the philosophers interested in deontic logic . A revised version was published in 1971 as Kanger (1957171). 2 Part of the content of Hintikka (1957) is included in Hintikka (1971). Kanger uses 'Rightp ' as the abbreviation of '-.Ought-.p'; I shall use here the customary notation of 0 for the concept of 'ought' (obligation) and P for the concept of ' may' (permissibility). The latter concept is one of the four senses of 'right' distinguished by Kanger (195711971, 42) . 4 Jergen Jergensen (1937-1938, 290) formulated this problem as follows : "According to a generally accepted definition of logical inference only sentences which are capable of being true or false can function as premisses or conclusions in an inference; nevertheless it seems evident that a conclusion in the imperative mood may be drawn from two premisses one or both of which are in the imperative mood ." Alf Ross (1941, 55) has called this difficulty "Jergensen's dilemma". 5 von Wright has analyzed the semantics of norm sentences by means of the concept of 'satisfaction' (or satisfiability) also in his more recent publications; in von Wright (1983, 130) he calls deontic logic "a logic of norm-satisfaction". 6 The distinction between these two uses of deontic sentences has sometimes been formulated as the distinction between norms (norm-formulations) and normat ive propositions (normative statements); see G. H. von Wright 1963, 93-106, and E. Bulygin 1982, 128-130. 1 In (1957) Kanger distinguishes two ways of interpreting quantifiers in modal contexts, and expresses the corresponding two universal quantifiers by '(x)' and '(Ux)'; the quantifier rules adopted in Kanger (1957/1971) are those of the (Ux)-quantifier and its existential counterpart. Sten Lindstrom (2000) has shown that these quantifiers have some very odd and unusual properties. 8 The intuitive non-validity of (V'x)PAx :::> P(V'x)Ax, a formula equivalent to (6), is equally obvious. Unlike many problematic operator switch principles of modal logic, these formulas fail to be valid even if the domains of individuals under consideration are assumed to remain the same across possible worlds . 9 See, for example, Makinson (1981) , for the interpretational problems that arise in this area. For a discussion of the problems in Kanger's interpretation of quantifiers in modal logic, see Lindstrom (2000) . 10 Unfortunately I have been unable to find a copy of this work. II According to Krister Segerberg (1992, 348-350), this way of analyzing the concept of 'action' may go back to St. Anselm (1033-1109), who distinguished the constructionsfacere esse (to do p),facere non esse (to do not-p), nonfacere esse (not to do p), and nonfacere non esse (not to do not-p) .
STIG KANGER ON DEONTIC LOGIC
147
12 These principles include the principle that if p and q are logically equivalent, so are Do(a ,p) and Do(a,q), and the principle that Do(a ,p) entails p; see Kanger and Kanger (1966 ,89). 13 Kanger and Kanger (1966, 101-102) observe some differences between their concepts of 'claim' and 'immunity' and those of Hohfeld' s system. 14 Cf. Aqvist and Mullock (1989, 37, 93); Belnap (1991 , 792). 15 G. H. von Wright (1963 , 28 - 36) understands the negative condition as referring to situations in which the agent is passive, i.e., docs not "interfere with the course of nature". For discussions of von Wright's theory, see Segerberg (1992, 351 - 354), Hilpinen (l997a, 5- 8). 16 In view of (19), it is clear that a Kanger-type semantics of action sentences does not give an analysis of the concept of ' action' , but rather makes it possible to distinguish several "modes of action". 17 However, some more complex form of the counte rfactual condition may apply to such cases . 18 Cf. Hilpinen (l997a, 18). For modes of agency with a weak positive condition, see Hilpinen (1997a, 11-12, 18). 19 For some recent developments and applications of Kanger's (or Kanger-type) logic of action in deontic logic and computer science , see Jones and Sergot (1993, 292 - 301) , Santos and Carmo (1996), and Sergot (1999) .
REFERENCES Anderson, Alan Ross, 1956, The Formal Analysis of Normative Systems (Technical Report No. 2, Contract No. SARlNonr-609 (16), Office of Naval Research, Group Psychology Branch), New Haven . Reprinted in N. Rescher (ed.), The Logic of Decision and Action, University of Pittsburgh Press, Pittsburgh, 1967, pp. 147-213. Aqvist, Lennart, 1974, "A New Approach to the Logical Theory of Actions and Causality", in S. Stenlund (ed.), Logical Theory and Semantic Analysis, D. Reidel, Dordrecht, pp. 73 -91. Aqvist, Lennart, and Philip Mullock , 1989, Causing Harm, Walter de Gruyter, Berlin -New York. Belnap, Nuel, 1991, "Backwards and Forwards in the Modal Logic of Agency", Philosophy and Phenomenolog ical Research 51, 777 - 807. Belnap, Nuel, and Michael Perloff, 1990, "Seeing to It That: A Canonical Form for Agentives", in H. Kyburg et al. (eds.), Knowledge Representation and Defeasible Reasoning , Kluwer Academic Publishers, Dordrecht- Boston, pp. 167- 190. Belnap, Nuel, and Michael Perloff, 1992, "The Way of the Agent", Studia Logica 51, 463 -484. Bulygin, Eugenio, 1982, " Norms, Normative Propositions, and Legal Statements", in G. Fleistad (ed.), Contemporary Philosophy. A New Survey . Vol. 3: Philosophy of Action, Martinus Nijhoff, The Hague, pp. 127-152. Bulygin, Eugenio , 1992, "On Norms of Competence", Law and Philosophy 11, 201 - 216 . Chellas, Brian F., 1980, Modal Logic : An Introdu ction, Cambridge University Press, Cambridge . Chellas, Brian F., 1992, "Time and Modality in the Logic of Agency" , Studia Logica 51, 485 517 . Fellesdal. Dagfinn, and Risto Hilpinen, 1971, "Deontic Logic: An Introduction", in R. Hilpinen (ed.) , Deontic Logic: Introductory and Systematic Readings, D. Reidel , Dordrecht, pp. 1- 35. Hart, Herbert, and Anthony Honore , 1959, Causation in the Law, Clarendon Press, Oxford . Hilpinen, Risto, 1997a, "On Action and Agency ", in Sten Lindstrom and Eva Ejerhed (eds.), Log ic, Action and Cognition, Kluwer Academic Publishers, Dordrecht and Boston, pp. 3- 27.
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Hilpinen, Risto , 1997b, "On States , Actions , Omissions and Norms ", in G. Holmstrom-Hintikka and R. Tuomela (eds.), Contemporary Action Theory, Vol. 1, Kluwer Academic Publishers, Dordrecht and Boston, pp. 83- 107. Hintikka, Jaakko, 1957, "Quantifiers in Deontic Logic", Societas Scientiarum Fennica, Commentationes Humanarum Litterarum 23:4, Helsinki. Hintikka, Jaakko, 1971, "Some Main Problems of Deontic Logic" , in R. Hilpinen (ed.), Deontic Logic: Introductory and Systematic Readings, D. Reidel , Dordrecht, pp. 59 -104. Hohfeld , Wesley Newcomb , 1919, Fundamental Legal Conceptions as Applied in Judicial Reasoning, ed . by W. W. Cook , Yale University Press, New Haven . Horty, John , and Nuel Belnap, 1995, "The Deliberative Slit : A Study of Action, Omission, Ability, and Obligation", The Journal of Philosophical Logic 24,583-644. Jones, Andrew J. I., and Marek Sergot, 1993, "On the Characterization of Law and Computer Systems : The Normative Systems Perspective", in 1. J. Ch. Meyer and R. 1. Wieringa (eds.), Deontic Logic in Computer Science: Normative System Specification, John Wiley & Sons, Chichester - New York, pp. 275-307. Jergensen, Jergen, 1937-1938, "Imperatives and Logic", Erkenntnis 7, 288 -296. Kamp, Hans , 1979, "Semantic versus Pragmatics", in F. Gunther and S. J. Schmidt (eds.), Formal Semantics and Pragmatics for Natural Languages, D. Reidel, Dordrecht, pp. 255 - 287 . Kanger, Helle, 1964, Human Rights in the U'N. Declaration . Acta Universitatis Upsaliensis , Uppsala University, Uppsala. Kanger , Stig, 1957, "A Note on Quantification and Modalities", Theoria 23, 133-134. Kanger, Stig , 1957/1971, "New Foundations for Ethical Theory ", in R. Hilpinen (ed.), Deontic Logic: Introductory and Systematic Readings . D. Reidel, Dordrecht, pp. 36- 58. Originally published as a privately distributed booklet New Foundations for Ethical Theory, Part I. Stockholm 1957. Kanger, Stig , 1963, "Rattighetsbegreppet", in Sjufilosofiska studier tilldgnade Anders Wedberg den 30 mars 1963 . Philosophical Studies published by the Department of Philosophy, University of Stockholm, No.9. Stockholm. Kanger, Stig , 1972, "Law and Logic", Theoria 38, 105-132. Kanger , Stig, 1985, "On Realization of Human Rights ", in G. Holm strom and A. J. I. Jones (eds.), Action, Logic and Social Theory. Acta Philosophica Fennica 38, Societas Philosophica Fennica, Helsinki . Kanger , Stig, and Helle Kanger, 1966 , "Rights and Parliamentarism", Theoria 32 , 85-115 . Reprinted (with changes) in R. E. Olson and A. Paul (eds.), Contemporary Philosophy in Scandinavia, The Johns Hopkins Press, Baltimore and London, pp. 213 -236. Leibniz, Gottfried Wilhelm, 167111930, "Elementa iuris naturalis ", in G. W. Leibniz, Siimtliche Schriften und Briefe. Sechste Reihe: Philosophische Schriften, Bd, 1, Otto Reichl Verlag, Darmstadt, pp. 431-485. Lindahl, Lars, 1977, Position and Change, D. Reidel, Dordrecht and Boston . Lindahl, Lars, 1994, "Stig Kangcr's Theory of Rights" , in D. Prawitz et al. (eds .), Logic, Methodology and Philosophy of Science IX, Elsevier Science B. V., Amsterdam, pp. 889 -911. Lindstrom, Sten, 2000 , "An Exposition and Development of Kanger 's Early Semantics for Modal Logic" , in G. Holmstrom-Hintikka, S. Lindstrom and R. Sliwinski (eds .), Collected Papers of Stig Kanger with Essays on His Life and Work, Vol. II, Kluwer Academic Publi shers, Dordrecht and Boston. Makinson, David , 1981, "Quantificational Reefs in Deontic Waters ", in R. Hilpinen (ed.), New Studies in Deontic Logic, D. Reidel, Dordrecht, pp. 87 -91.
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Makinson , David, 1986, "On the Formal Representation of Rights Relations. Remarks on the Work of Stig Kanger and Lars Lindahl ", Journal of Philosophical Logic IS , 403- 425. Perloff, Mich ael, 1991, "Stit and the Language of Agency", Synthese 86, 379- 408. Porn .Ingmar, 1974, "Some Basic Concepts of Action ", in Soren Stenlund (ed.), Logical Theory and Semalllic Analysis.D.Reidel. Dordrecht, pp. 93-101. Porn, Ingrnar, 1977, Action Theory and Socia l Science, D. Reidel, Dord recht. Ross, Alf, 1941, "Imperati ves and Logic", Theoria 7, 53-7 1. Santos, Filipe, and l ose Carrno, 1996, "Indirect Action , Influence and Respon sibility", in M. A. Brown and 1. Carmo (eds.), Deontic Logic, Agency and Normative Systems, Sprin ger Verl ag, New York and Berlin , pp. 194- 215. Searle,lohn, 1975, "A Taxonomy of Illocutionary Acts", in K. Gunderson (ed.), Languag e, Mind and Knowledge. Minnesota Stud ies in the Philosophy of Science 7, Univer sity of Minnesota Press, Minne apolis, pp. 344- 369. Segerberg, Kriste r, 1992, "Getting Started: Beginnings in the Logic of Action", Studia Logica: An Intemational Journal for Symbolic Logic 51:3-4 (Special issue: Logic of Action), 347378. Sergot, Marek, 1999, "Normative Positions", in P. McNamara and H. Prakken (eds.), Norms, Logic and Information Systems, lOS Press, Amsterdam and B erlin , pp. 289- 308. von Wright , Geor g I-Ienrik, 1955, "a m s.k. praktiska slutledningar", Tidsskriftf or Rettsvitenskap 68,465-495. von Wright, Georg Henrik, 1963, Norm and Action, Rout ledge & Kegan Paul, London. von Wright, Georg Henrik, 1983, "Norms, Truth and Logic", in G. H. von Wright, Practical Reason. Philosoph ical Papers, I. Cornell University Press, Ithaca, pp. 130- 209.
LARS LINDAHL
STIG KANGER'S THEORY OF RIGRTS'
1. INTRODUCTION Stig Kanger regarded his theory of rights as one of his substantial contributions to philosophy; he worked on it, intermittently, for nearly thirty years. A starting-point was Kanger's interest in the classification of "fundamental jural relations" proposed by the American jurist W. N. Hohfeld, in the second decade of this century. Hohfeld's theory concerns an area which is mainly legal, and it belongs to the tradition of juri sts such as Jeremy Bentham and John Austin. Hohfeld distinguished the relations right, privilege, power, immunity, and their "correlatives" duty, no-right, liability, disability; one of Hohfeld's tenets was that each of these relations is a relation between two parties with regard to an action by one of them. 1 In his little book New Foundations for Ethical Theory, from 1957, Kanger presented his first explication of Hohfeld, He suggested that standard deontic logic, with only a deontic operator applied to sentences, is not adequate for expressing the Hohfeldian distinctions. The improvement he proposed was to combine a standard deontic operator with an action operator and to exploit the possibilities of external and internal negation of sentences where these operators are combined. In Kanger's 1963 paper "The Concept of a Right", his explication of Hohfeld was restated as a system of so-called simple types of rights . In this paper, however, the simple types are the basis of a theory of atomic types of rights, which is more of a genuine typology. In the explication of atomic types, the combinatory method of "maxi-conjunctions" is used for providing an elegant logical typology of normative relations . During the last two decades of his life, Kanger was interested in the application of his theory of rights in connection with human rights and social justice; in particular, he turned to the problem of what, in the U.N . Declaration on Ruman Rights , is meant by having a right. In this connection, Kanger became aware of the distinction between a person's having a right and this right 's being realized for the person. And so, in his last paper on rights, from 1985, Kanger dealt with the notion of realization of rights . lSI
G. Holmstrbm-Hintikka, S. Lindstrom and R. Sliwinski (eds.), Collected Papers of Stig Kanger with Essays on his Life and Work. Vol. II. / 5/-/7/. © 2001 Kluwer Academi c Publishers. Printed in the Netherlands. Originally published in D. Prawitz, B. Skyrms and D. Westerstahl (eds.) Logic. Methodology and Philosophy of Science IX Elsevier Science B.Y., 1994, pp. 889-9 11. Reprinted here with so me minor changes
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The first part of my paper contains a brief presentation of Kanger's typologies. After this, there follows a discussion of problematic points. The final part offers some suggestions for a positive solution to the most central problems. Kanger's ideas about realization make use of a much enlarged logical framework, the treatment of which would lead too far in the present essay. His basic theory of rights, however, is independent of these ideas.' II. STIG KANGER'S THEORY OF RIGHTS: A PRESENTATION
1. The Language used by Kanger The sentences on rights that Kanger tries to explicate are taken from juristic usage or plain ordinary language. Moreover, Kanger's explications are not stated within a strictly formal language but only semi-formally. Only two kinds of entities are explicitly referred to, namely agents, on the one hand, and states ofaffairs or conditions, on the other. Agents are either persons, like Mr. Smith, or so-called collective agents, such as the Swedish Government or Smith & Co, Ltd. As illustrations of the second group of entities we have, for instance, the state of affairs (or condition) that Mr. Smith gets back the money lent by him to Mr. Black, or that Mr. Smith walks outside Mr. Black's shop . In Kanger's view, negation, conjunction, disjunction etc. can be applied to states of affairs (or conditions) in the same way as they are applied to sentences, and the notion of logical consequence is applicable to them by analogy as well.' In order to state his explications in a general way, Kanger introduces letters for referring to agents or states of affairs that are chosen arbitrarily. He assumes that x.y.z,... are agents and that F,G,H,... are states of affairs. Moreover, Ftx, y), G(x, y), ... are assumed to be states of affairs "involving" (as Kanger says) agents x and y. To the Boolean connectives of negation, conjunction etc., Kanger adds the modal expressions "Shall" and "Do". Shall F is to be read "It shall be that P' and Do(x, F) should be read "r sees to it that P'. In his explication of rights, Kanger exploits the possibilities of combining the deontic operator Shall with the action operator Do. One example is Shall Do(x, F) which means that it shall be that x sees to it that F; another is ...,Shall Do(y, ""F) which means that it is not the case that it shall be that y sees to it that not F.5 The logical postulates for Shall and Do assumed by Kanger are as follows (where - is a relation of logical consequence, satisfying some reasonable postulates"):
STIG KANGER 'S THEORY OF RIGHTS
1. 2. 3. 4. 5.
If F - G, then Shall F - Shall G. (Shall F & Shall G) - Shall(F & G). Shall F - -Shall ..,F. If F - G and G - F, then Do(x, F) Do(x, F) - F.
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Do(x, G).
2. The Simple Types of Rights?
In Kanger's theory, there are several types of rights . A type of rights is always a relation between two agents with respect to a state of affairs or a condition. For instance, ifMr. Smith has lent 100 dollars to Mr. Black , and, therefore, has a right to get back the money lent, then, according to Kanger, Smith has a right of the simple type Claim against Black with regard to the state of affairs (or condition) that Smith gets back the money he has lent to Black. In this example, Claim is the type , Smith is the bearer, Black is the counter-party, and the state of affairs (or condition) that Smith gets back the money lent is (what may be called) the "object-matter". In the history of the analysis of rights, there is a traditional distinction between, on the one hand, "passive rights", or rights to have something done, and on the other hand, "active rights" or rights to do something. In Kanger's theory of simple types of rights , the first group , henceforth called Oirights, is explicated by "counter-party obligatives", while the second, called P-rights, are explicated by "bearer perrnissives", In the first group, we have four simple types , explicated as follows: Explicandum: O-right
Expli cans: Counter-party obligative
Claim(x, y, F(x, y)) Counter-claim(x, y, F(x, y )) Immunity(x, y, F(x, y )) Counter-immunity(x, y, F(x, y ))
ShallDo(y, F(x, y)) ; ShaIlDo(y, ..,F(x, y)) Shall .., Do(y, -n». y)) Shall .., Do(y , F(x, y))
For example, if Mr. Smith has an immunity against Mr. Black with regard to the condition that Mr. Smith walks outside Mr. Black's shop, this is explicated by: It shall be that Mr. Black does not see to it that Mr. Smith does not walk outside Mr. Black's shop. Each explicans satisfies the scheme, Shall ± Do(y, ± F(x, y)) , where ± stands for the two alternatives of affirmation or negation. The four bearer permissive types are explicated in this way:
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Explicans: Bearer permissive
Explicandum: P-right Power(x, y, F(x , y» Counter-power(x, y, F(x, y)) Freedom(x, y, F(x, y)) Counter-freedom(x, y , F(x, y»
'.., Shall .., Do(x, Fix , y» .., Shall > Do(x, ..,F(x, y» .., Shall Do(x, y» .., Shall Do(x, F(x, y»
-n».
Here, each explicans satisfies the scheme, .., Shall ± Do(x, ± F(x , y)). As an example, consider Mr. Smith's counter-freedom versus the police with regard to the condition that the police are informed about Mr. Smith's private life. In Kanger's explication, this would amount to: It is not the case that it shall be that Mr. Smith sees to it that the police are informed about Mr. Smith 's private life. Between the types of O-rights and the types of P-rights there exists a correspondence f such that if T is a type of O-right and T ' is a type of P-right, then T ' =f(T) in case for any x, y, F it holds that x has a right of type T versus y with regard to F(x, y) if and only if y has not a right of type T ' versus x with regard to F(x, y) . For example, Claim is the counter-part of counter-freedom, in the sense , that x has a claim versus y with regard to F(x, y ) if and only if y has not a counter-freedom versus x with regard to Fix , y ). According to the logical postulates , for some types it holds that membership of one type implies membership of another. For example, since Do(y, Fix, y» , y», Do(x, ..,F(x, y)), are inconsistent, Shall Do(y, F(x, y», Shall Do(x, are inconsistent as well; therefore, according to Kanger's explication, Claim(x, y, F(x, y», not Freedom(x, y, F(x, y)), are inconsistent.
-n».
3. The Atomic Types of Rights
The construction of atomic types is as follows . We begin with the list, Claim(x, y, F(x, y» , Counter-claim(x, y, F(x, y» , Imrnunity(x, y, F(x , y» , Counter-imrnunity(x, y, Ftx, y» , Power(x, y, F(x, y» , Counter-power(x, y, F(x, y» , Freedom(x, y, F(x , y», Counter-freedom(x, y , Fix, y)'),
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Starting from this list, we form every new list that can be obtained by negating either 0, 1,2,. 00 ' up to all 8 members of the list, while keeping the other members unnegated. Obviously, the number of all such lists will be 2 8 , i.e ., 256 . (Each choice of negated members of the list corresponds to the choice of a subset of the original list ; since the list has eight members, the number of its subsets is 28 . ) Of the 256 lists , however, all but 26 are inconsistent according to the logic of Shall and Do. Each of the remaining 26 lists, when regarded as a conjunction of its members, specifies an atomic type of rights. As an example, we consider atomic type No .5.
Name "Power, immunity, counter-power, counter-immunity". Explicans {<x, y, F> I..., Shall ..., Do(x, F(x , y» & Shall ..., Do(y, -Ftx, y» & ..., Shall ..., Do(x, ...,F(x, y» & Shall ..., Do(y, F(x, y» }.
We see that each conjunct in the explicans satisfies the scheme, (*)
± Shall ± Do G, ± F(x, y» ,
where ± and ; represent choices, as befo re. As suggested by David Makinson," we can say that each atomic type is explicated by a "maxi-conjunction", i.e., a maximal and consistent conjunction such that each conjunct satisfies scheme (*) . Maximality means that if we add any further conjunct, satisfying (*), then this new conjunct either is inconsistent with the original conjunction or redundant. Given the underlying logic , the atomic types are mutually disjoint and their union is exhaustive. Not all of Kanger's types of atomic rights are types of rights in any rea sonable sense. Consider Kangers atomic typ e No. 23. According to Kanger, x has a right of atomic type No. 23 versus y with regard to F(x, y) if the following is true: Not freedom(x, y, F(x, y» , Not immunity(x, y, F(x , y», Not counter-claim(x, y, F(x, y». (Type 23 is specified by the list we obtain if all the lines of the original list of bearer permissives and counter-party obligatives are negated, and redundant members of the list have been dropped.) Since all members of the list are negated, x's relationship versus y with regard to F(x, y) is one of not having a right of any kind, rather than one of having a right of a certain type. To say, in this case, that x has a right of a particular kind is like saying that poverty is a
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particular kind of opulence. Kanger 's atomic typology , therefore, is a typology of normative relations from the "rights perspective" rather than a typology of rights. III. SOME ASPECTS OF KANGER'S THEORY In this section I will argue that Kanger 's typology represents an improvement in the theory of duties ; as a theory of rights, it suffers from a number of difficulties. 1. Kanger's Theory as a Theory of Duties Kanger's typologies are primarily typologies of duties and non-duties; x's 0rights versus yare explicated in terms of y' s duties, i.e., in terms of counterparty obligati ves; correspondingly, x' s P-rights versus yare explicated in terms of x' s non-duties, i.e., in terms of bearer permissives. Thus, the counter-party obligative Shall Do(y, Ftx, y» is an explication of " y has a duty to the effect that Do(y, F(x, yj)", Correspondingly, the bearer permissive .,Shall Do(x, F(x, y» is an explication of "x has no duty to the effect that Do(x, F(x, y»". Other types of duty/non-duty are explicated if a negation sign is inserted before Do, before F(x, y) or before both. It follows that the atomic types are intersections of different types of duty/ non-duty for two agents with regard to one and the same state of affairs . If conceived of as typologies of duties/non-duties, Kanger 's typologies represent a considerable improvement on earlier representations. In deontic logic, statements of duties are sometimes reproduced with the help of deontic operators carrying an index, like 0 ;, OJ'' '' where i.j are parameters or variables for agents; an expression of the form OF is read "F is obligatory for i".9 Compared with this construction, Kanger's combinations of Shall and Do have greater expressive power ; for example, instead of staying with "not-F is obligatory for x", as expressed by Ox -.F, a distinction can be made between the cases Shall -.Do(x, F), Shall Do(x, -.F) . The idea of combining a non-relativized deontic operator with an agentrelative action operator has another advantage as well (though this was not exploited by Kanger himself) . This advantage consists in the possibility of iterating operators in a meaningful way. It is controversial whether iterations of the kind OOF, O.,OF etc., make sense; in any case it is not clear what is meant by statements of this form. 10 If we combine Shall and Do, however, new possibilities of iterations are opened. For example, in an organization, the boss is the superior of the clerk who is the superior of the errand-boy; it may well
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be the case that the boss is permitted to impose a duty on the errand-boy to work over-time, while the clerk is not permitted to impose such a duty on him. This distinction can be expressed by the two sentences .., Shall .., Do(x, Shall Do(z, F»); Shall .., Do(y, Shall Do(z, F»); where x is the boss, y is the clerk and z is the errand-boy. II In the sentences just illustrated there is an instance of the Do operator between the two instances of the deontic operator. 2. Problems for Kanger's Theory of Rights
There are well-known problems connected with Kanger's theory conceived of as a theory of rights. (i) IDENTlACATlON OF BEARER AND COUNTER-P ARTY . As remarked by 1.S. Mill , the notion of a claim-right is connected with the idea that particular actions or omissions constitute cases of injustice committed against an assignable person (the bearer of the right); the injustice may consist in "depriving a person of a possession, or in breaking faith with him, or treating him worse than he deserves, or worse than other people who have no greater claims". The assumption that an injustice is committed, in turn, implies that the bearer of the right is wronged: "in each case the supposition implies two things - a wrong done, and some assignable person who is wronged"." In accordance with this suggestion, a criterion of appropriateness for the explication of a claim-right is as follows :
(1)
x has a claim-right versus y to the effect that F(x, y)
only if it is true that, (2)
If F(x , y) is not the case, then x is wronged ,
(or x has a legitimate complaint). There are many interpretations of x, y, F such that Kanger's explicans for (1), i.e., (3)
Shall Do(y, F(x , y)),
holds, while (2) is false . The policeman has a duty to seize the murderer, who tries to get away. If we set x = the murderer, y = the policeman, and F(x, y) for "x is seized by y" , (3) is true. On the other hand, (2) is false in this case ; the murderer is not wronged, and has no legitimate complaint, if the policeman does not succeed to seize him. The murderer has no right to the effect that he be seized .
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Assume, on the other hand, that Creditor has lent 100 dollars to Debtor, and that, as a consequence, Debtor has a duty to pay this amount back. If we set x = Creditor, y = Debtor, and F(x, y) for "x receives 100 dollars from y", the same counter-obligative formula (3) is true for this interpretation of the variables as well. In this case, however, (2) is true, and Creditor has a right to get his money back. Kanger's explicative formula (3) does not suffice to distinguish the two cases. 13 One might try to defend Kanger's theory by going to the theory of atomic types of rights. But this does not help much since the same atomic type, viz. No 6 (claim, power, counter-freedom) seems to be appropriate in both of the two examples illustrated. As applied to x versus y with regard to F(x, y) , type No 6 is explicated as follows : Shall Do(y, F(x, y )) , ..., Shall ..., Do(x, F(x, y )), ..., Shall Do(x, F(x, y )). The three sentences are true in the murderer case as well as in the Creditor case . (Observe that the third formula is true for the murderer, since he has no duty to see to it that he is seized by the particular policeman in view.) The problem just illustrated for Claim-rights is that the explicandum is not entailed by the explicans. This problem can be shown to exist as well for the other types of a-rights, i.e., counter-claim, immunity, counter-immunity. If this objection is correct for a-rights, there will be a problem for P-rights as well. This time , however, the problem is that the explicans is not entailed by the explicandum. Let us remember that, in Kanger 's construction, if T is a type of P-right, there is a type T* of O-right such that T(x, y , F(x, y ) ) if and only if not T*(y , x, F(x, y)). Furthermore, the types are constructed in such a way that q> is the explicans of Ttx, y, F(x, y)) if and only if'-xp is the explicans of T*(y, x, F(x , y)). By contraposition, therefore, if q> does not entail T*(y, x, F(x, y)) , then Ttx, y, Fix, y )) does not entail ""q> . Let us illustrate the technical argument with an example. Suppose that y has a house in a suburban area. We may plausibly assume : y has no right that x does not walk around in the garden of y' s neighbor (x's walking in that garden is no concern of y ' s). In Kanger's language, this means that (1)
not Counter-immunity(y, x, F(x, y))
where Ftx, y) expresses that x walks in the garden of y's neighbor. (1) is equivalent to (2)
Power(x, y , F(x, y )).
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However, from (1) and (2) it ought not to follow, as in Kanger's theory , (3)
.., Shall .., Do (x , F(x , y)),
i.e., it should not follow that it is permitted that x walks in the garden of y ' s neighbor. For example, we may well suppose that x is a mortal enemy of y' s neighbor, and that this neighbor has expressly forbidden x to walk in his garden ; if so, the negation of (3) is true. RI GHTS OF RECIPIENCE WmIOUT A COUNTER- PARTY. There are statements about "rights to receive", which do not imply statements about duties and which are not tractable in terms of Kanger' s typologie s. An example is as follows:
(ii)
(1)
Children have a right to be nurtured.
If x is a child, nothin g follows from (1) about who has a duty to nurture it. Rather , it has been suggested, the acceptance of ( I) is a first and basic point of departure from which further considerations can be made concerning duties for others (parents , guardians , authorities and so on)." Indeed, from (1) it does not even follow that for each child there is some y such that y has a duty to nurture it; i.e., if x is a child it does not follow that (2)
C:Jy)(Shall Do(y, F(x , y))
where Ftx, y) means that x is nurtured by y. It may be suggested that (1) entail s that if x is a child , then, (3)
Shall (::Jy) [D o(y , F(x , y ))].
(2), however, does not satisfy the Kanger scheme for counter-party obligatives since a quantifier is embedded between Shall and Do. Since the quantifier is located after Shall, not before it, (2) does not say that anyone has a duty; rather (2) prescribes that there be someone who nurture s x. (iii) LE GAL POWER. It is often maintained that so-called legal power is a type of right not tractable in terms of duties or non-duties. Suppo se that F is a legal condition; F(x , y ) signifies, for example, that the ownership of the Glenro y estate is transferred from x to y . Then (it is argued), the statement (4)
x has the legal power to see to it that F(x , y) ,
cannot be analyzed as (5)
.., Shall .., Do(x, F(x, y)) ,
which is Kanger's general explication scheme for the simple type of right
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called "power": (5) expresses permission, while (4), it is usually held, expresses a capacitive dimension. IS On this point, I think that Kanger's analysis can be defended. Admittedly, as "legal power" is usually understood, (4) and (5) are not synonymous, and Kanger's use of the term "power" is misleading. What Kanger wants to assert, however, is rather that (5) is an explication of a general notion of a right-to-do (what in German would be called Befugnis), i.e., of (6)
x has a right to see to it that F(x, y).
(Apparently, Kanger did not find a suitable word in English corresponding to Befugnis.) Admittedly, in some circumstances, a thief is able to transfer the ownership of stolen goods to a purchaser who is in good faith (the sale will be legally valid). But, obviously, the thief has no right to do this . Perhaps (4) is true for this interpretation of F, x , y, but since (5) is false , (6) is false as well. In one sense of "legal power", the thief has the legal power to sell the stolen goods. But if so, "legal power" is not a type of right. (iv) RELEVANCEOF CLAIM -HOLDER'SWILL. Suppose that Mr. Smith has a claim versus
the community to receive medical care. If x = Mr. Smith , y = the community, and F(x, y) is the condition that x receives medical care from y , then (1)
Claim(x, y, F(x, y))
is explicated by (2)
Shall Do(y, F(x, y)).
According to (2), the laws are disobeyed if y does not see to it that x receives medical care, even if this is due to x's refusing to receive it. However, all duties can be fulfilled even if x does not receive medical care, namely in the case that he does not want to have it. However, we might say that the "object-matter" of Smith's claim, expressed by F(x, y), should appropriately be constructed in a different way, namely as the condition that medical care is made available to him by the community. The latter is another way of saying that Smith receives medical care, if he wants to have it. Of course, the expression F(x, y) does not make it explicit that a conditional is involved, and it will be a problem how such a conditional should be expressed within the simple language presupposed by Kanger. However, this is a difficulty about expressing the "object-matter" of rights rather than an objection to the typology of rights itself. A possible way out, in the specific example, is to replace F(x , y ) in (2) by the material equivalence G(x, y) ~ Hix, y ), i.e., to substitute (2) by
STIG KANGER'S THEORY OF RIGHTS
(2')
161
Shall Do(y, G(x, y) - H(x, y)),
where G(x , y) expresses that x (informs y that he) wants medical care and Hix, y) that x receives medical care from y . This would keep the analysis within Kanger's basic framework; however, it remains an open question whether the construction is a good one. As regards bearer-permissive rights, the problem is somewhat different. Mr. Brown has a right to walk in the municipal park, if he wants to, but need not walk there if he does not want to. In Kanger's typology, the relevance of Mr. Brown's will in this case can be expressed by the conjunction -'Shall -,Do(x, Ftx, y)) & -'Shall -,Do(x, -,F(x, y )), where F(x, y) expresses that x walks in y's park; the sentence says that x has both power (=:: Befugnis) and counter-power, as regards his walking in the park. Since, in this case, the power is "two-sided" (power and counter-power), it is sometimes described as bilateral. Among theories of rights the so-called will theory, making relevance of the right-holder's will a conceptual characteristic of rights, has a respectable ancestry. A modern version of this theory has been developed by the Oxford legal philosopher Sir Herbert Hart. In Swedish philosophy, views similar to Hart's have been proposed by Sven Danie lsson." However, there are claim-rights where the claim-holder's will is irrelevant, and there can be powers (in Kanger's sense) which are not bilateral. The statement that all children have a right to be given elementary education is compatible with the proposition that such education is compulsory, i.e., that refusal to partake in the education is inoperative. This shows that the objectmatter of a claim-right should not always be construed by a conditional ofthe kind illustrated, where the claim-holders will is made relevant: relevance of the claim-holder's will is not a general characteristic of claim-rights. Similarly, the statement that the policeman has a right to try to seize the thief is compatible with the statement that trying to do so is compulsory. The policeman's power is not bilateral, and it is not relevant what the policeman wants to do. As is well-known, the notion of a right plays, and has played, an important part in many moral and political theories . Various theories emphasize different features of the notion of a right, or even define the notion in different ways, using it as a tool for an ideological message. This fact can be described in various ways: we might say that the notion of a right is "theory-dependent", or, that it is a "contested concept", or with Charles Stevenson, that there exist various persuasive definitions of the notion . I? Those modem theories emphasizing relevance of the right-holder's will can be called liberal theories, in a
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wide sense. Since liberal theory occupies an important place in political thought, it is only to be expected that we are apt to regard cases where the right -holder's will is relevant as the central cases of rights. On the other hand, a general philosophical analysis of rights ought to avoid incorporating as definitional characteristics such features that are asserted by a specific moral or political theory. (v) THE HETEROGENEITY OR HOMOGENEITY OF RIGfITS. Kanger never addresses the question whether the various types have anything in common which justifies calling all of them types of rights. He seems to hold that this problem is not worth pursuing, since the term "a right" is ambiguous; in fact, in the opening of his 1963 paper on rights, he says: "It is almost a commonplace that the idea of a right is vague and ambiguous...". The problem is whether there is any predicate
of agents, the logic of R will be standard deontic logic: If A is a theorem, then R(x, y, A) is a theorem; R(x, y, A) & R(x, y, A - B) - R(x, y, B); R(x, y, A) - -.R(x, y, -.A) .25 To simplify the exposition, we introduce a corresponding "permi ssive" operator R * by the definition R*(x, y, A) - -.R(y, x, -.A),
where the right hand side expresses that -.N(A - W(y, x)).
Thus R*(x, y, A) expresses that y is not necessarily wronged by x if A is realized.
2. Simple and Atomic Types of Rights As will be remembered from section II. Kanger's explicans-formulae for simple types of O-rights (x versus y with regard to F(x, y)) all satisfy the scheme, Shall ± Do(y, ± F(x , y)).
In this scheme, let us substitute Shall( ...) by R(x, y, ...) and F(x, y) by F (where F can be any condition, involving x, y, or not) . We obtain,
STIG KANGER 'S THEORY OF RIGHTS
R(x , y, ± Do(y, ±
165
F».
Using this latter scheme, we can reconstruct all of Kanger's simple types of O-rights: claim, counter-claim, immunity, and counter-immunity. Due to the introduction of the notion of being wronged, however, their explication will differ from Kanger' s, and the problem of identifying the bearer does not occur. For example, Claim(x, y, F(x, y» is explicated by, R[x, y, Do(y, F)],
i.e .,
Nl-Doty, F)
~
W (x, y»).
We will no longer have to say , as in the example discussed in section III, that the murderer ha s a claim versus the policeman to the effect that he is arrested by the policeman. In a similar wa y, all of Kanger' s simple types of P-rights can be reconstructed within the new system. Kanger's ex plicans- sentences for P-rights (x versus y with regard to F(x , y» all satisfy the scheme,
-sien ± Do (x, ± F(x , y» . If we substitute ",Shall(...) by R* (x , y,...), and F(x, y) by F, we get the scheme, R*(x, y, ± Do (x , ±
F»,
i.e. , ..,N[± Do (x , ± F)
~
W(y, x )] .
Using this scheme, all of Kanger' s types of P-rights can be reconstructed: power (= Bejugnis), counter-power, freedom, counter-freedom. For example, Power(x, y, F) becomes R* (x, y, Do(x, F» , and is explicated by ..,N[Do(x, F)
~
W(y, x )].
We avoid the problem about counter-parties that is connected with Kanger' s explication. In the example from section III, of x' s walking in the garden of y' s neighbor z, we can make the two statements, Power(x, y, F) , not Power(x, z, F) i.e., x has a power (= Befu gnis) versus y with regard to walking in z' s garden, but x does not ha ve this power vers us z (the owner) himself. The distinction is accomplished, since we ha ve the res pe ctive explicatio ns,
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..,N[Do(x, F) - W(y, x)] , N[Do(x, F) - W(z, x)].
Thus it appears that, using R, we can reconstruct the complete lists of four types of O-rights and four types of P-rights. Given the list of the eight simple types, we can, of course, reconstruct a theory of atomic types of rights by the method of "maxi-conjunctions". The number of atomic types, however, will be greater than Kanger admitted. This is due to the fact that while (1)
Shall Do(y, F) - Shall ..,Do(x,"'F)
is a theorem in Kanger's theory (since Do(y, F), Do(x,"'F) are inconsistent), the corresponding reconstructed formula (2)
R(x, y, Do(y,
F») -
R(y, x, -Doo,
..,F»)
i.e., [N(..,Do(y, F) - W(x, y))] - [N(Do(x, "'F) - W(y, x))],
does not follow from the axioms hitherto assumed in the reconstructed theory. (If (2) were a theorem, we would get 26 atomic types , as does Kanger.) It would lead too far afield to discuss in any detail the merits of (2). If, however, we want to have (2) as a theorem, while keeping the former basis of the reconstructed theory untouched, the question arises which further axiom or axioms should be added. There may be various possibilities. Among these is the following pair of additions: III. IV.
N(F - G) - N[Do(x, F) - Do(x, G)]; N[Do(x, W(x, y)) - W(y, x)].
(If these are added, (2) can be derived.") III is easily understood; but IV needs some comment. It says that, necessarily, if x himself sees to it that he is wronged by y, then it follows that y is wronged by x. (This seems, in fact, to be the rationale behind the Kanger theorem (1).) For example, suppose that a child, by escaping from school, sees itself to it that it is wronged insofar as it does not receive the education that is due to it. Then it follows that those who have the duty to give the child its education (teachers, schoolmasters etc.) are wronged by the child 's escaping, which prevents them from full filling their duty . The acceptability of III and IV as logically valid may well be questioned. But if so, the Kanger theorem (1) can be questioned with as much justification.
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3. Rights without a Counter-party
We often use statements of the kind "x has a right to..." without mentioning any counter-party. Is it possible to explicate such statements using our twoplace predicate W? Three examples will be discussed. The first one concerns the colloquial use of "having a right", emphasized by Alan White. Suppose we say to x: "You have the right to feel proud." Such a statement is somewhat ambiguous. One plausible interpretation, however, might go as follows . If x does not see to it that he feels proud, then he is wronged by himself; furthermore, for any y other than x, if y sees to it that x does not feel proud , then x is wronged by y. This way, counter-parties are seen as implicitly referred to, and the statement can be explicated in terms of the reconstructed notion. The next example is adapted after one proposed by Bengt Hansson." Petaluma is an area of private property, where different parts are owned by different people; we assume that for each land-owner y, y is wronged if x walks on his land. If F(x) expresses that x walks on Petaluma land, we have -,(3y)(N[F(x) - W(y , x)]),
since no land -owner is wronged if x walks on Petaluma land belonging to another land-owner (cf. the example, above , concerning x walking in the garden of y' s neighbor). On the other hand, in the example, N[F(x) - (3y)(W(y, x)] .
This sentence expresses, simpliciter, that x has no right to walk on Petaluma land. The third example is the one referred to in section III, that all children have the right to receive nutrition. We suppose that x is a child and that F(x) expresses that x receives nutrition ; we want to express that x has the right to receive nutrition. This sentence is compatible with -,(3y)N[-,Do(y, F(x)) - W(x, y )],
i.e. there need not be any particular agent by whom the child is wronged if that agent does not see to it that the child receives nutrition . On the other hand, we might suggest the following as an improved interpretation: N[-,(3y)(Do(y, F(x))) - ( 3y)(W(x, y ))].
That is: if no-one sees to it that x receives nutrit ion, then there is someone by whom x is wronged. The last two examples illustrate how predicate W can be used in a flexible way to explicate sentences that cannot be well interpreted even in terms of the reconstructed notions of rights against a counter-party. In the last of the three
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examples, however, the explication given may be questionable. Indeed, the example may suggest that, in addition to the two-place predicate W, we can be in need of a one-place predicate W for "is wronged", such that W(x) expresses that x is wronged, simpliciter. If we introduce such a notion, we should assume that W(x, y) implies W(x) but not that W(x) implies (3y)(W(x, y». The purpose of introducing a one-place predicate W would be to use it for interpreting a notion R(x,...), where there is no counter-party, according to the formula: R(x, A) - N(-,A - W(x». W ith axiom (I), as well as W(x, y ) - W(x) and W (x) - S, we would get standard deontic logic for R(x,...), as well as further theorems like R(x, A) - -,R(y, ...,A); R(x, y, A) - R(x, A); and so on . The question whether there is a need for introducing the one-place predicate W, however, is left open here .
4. The Impersonal Operator Shall and the Reconstructed Notion ofa Right A typology of rights, based on the notion of "being wronged by", as developed in the foregoing, is more akin to Hohfeld's original idea of jural relations between parties than is the Kanger typology, based on the impersonal operator Shall." By the axiom W(x, y ) - S, we established a connection since, from our assumptions, it follows that R(x, y, F) - Shall F. The suitability of establishing this connection may be questioned. In any case, however, we ought not to assume any of
S - (3.x)(::Jy)(W(x, y»; N(-,F - S) - (3.x)(:3y)N(-,F - W(x, y» . That is, we should not assume that if the Code is violated, then someone is wronged by someone, or that if something is prescribed, then someone has a right versus someone as regards the fulfillment of what is prescribed. There are many prescriptions (administrative regulations, traffic prescriptions etc .) which do not imply rights for particular agents; the contrary assumption would lead to an inflation of rights where the group of right-holders is very diffuse. This shows that there is room for the reconstructed typologies of rights that are genuine relations of rights between parties, alongside with typologies of normative positions expressed in terms of the operator Shall. For the latter kind of typologies, Stig Kanger's idea of combining Shall and Do is very
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169
useful. As suggested in the foregoing, typologies satisfying the Kanger schemes can be seen as typologies of posit ions of duty or non-duty.
University of Lund NOTES The present essay is part of a project which was supported by The Soderberg Foundations. On the theories of Bentham, Austin and Hohfeld , see Lindahl (1977), Chapters I and 6, with further references. 2 See Kanger (1985). The enlarged logical apparatus is developed in Kanger (1977) and (1986). 3 Kanger (1963), Kanger & Kanger (1966), and Kanger (1972). 4 During the last years of his life, Kanger planned to develop a general theory of conditions based on cylindric algebra; unfortunately, however, the plan was never realized. 5 The systematical use of "sees to it that" in combination with other operators is a characteristic feature in the work of Kanger' s pupils within the Fenno-Scandian school of legal theory and social science. It is used in Porn (1970), (1971), (1974), (1977), in Lindahl (1977), in H. Kanger (1984), in S.O. Hansson (1986), (1990-91), and in Holmstrom-Hintikka (1991) . For some early suggestions, resembling Kanger's idea of combining Shall and Do, see Anderson (1962) and Fitch (1967). 6 The principles assumed by Kanger for the relation of logical consequence are as follows : (i) (ii) (iii)
If I' and I' - G, then G; If F - G, then .,G - .,1'; If I' - G and G - 1J, then F -
H,
See , Kanger & Kanger (1966), at p. 88, note 3. See , concerning Kanger's typologies, Kanger (1963), Kanger & Kanger (1966), Lindahl (1977), and Makinson (1986). 8 See Makinson (1986), at pp . 405 f. 9 See , for example, B. Hansson (1970). 10 For a discussion of this problem, see Barcan Marcus (1966), v. Wright (1968), Szewak (1974) and Opfermann (1977). 11 For a theory exploiting these possibilities. see Lindahl (1977), Part II (the theory of "ranges of legal action" or Spielraum). For a comment, see Talja (1980), where the tools of lattice theory are used. 12 Mill (1910), p. 46 . 13 Cf. Lindahl (1977), pp. 45 f., and Makinson (1986). 14 See N. MacCormick's essay "Children ' s rights : A Test-case for the Theories of Right", in MacCormick (1982). 15 See Lindahl (1977), p. 51 and pp. 194- 211 , with further references. 16 See Hart (1972), and S. Danielsson's essay "Fri- och rattigheter" in Danielsson (1986). 17 See Stevenson (1944). 18 Tuck (1979). Cf. M. Golding (1990), at p. 55 . 19 White (1984), especially at p. 114. Of course, the idea of unambiguity is compatible with holding that there are, nevertheless, several types of rights . To make an analogy, the unambiguity of the term "bird" in zoology is perfectly compatible with assuming that there are various kinds of birds. 7
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See Anderson (1956) . reprinted in Rescher (1967) . See. for example . Hughes & Cresswell (1968). 22 The Anderson construction is. of course. connected with the problem of how to express "If .... then ---" in a satisfactory way within a logically well-written language . Our reason for not discussing this problem is that. even if N(... - ---) is questionable in the context at hand. it will keep us close to the Kanger typologies and logical framework. 23 Anscombe (1967 ). 24 In passing, we observe that a weaker logic is obtained if we drop S together with (I) and (II). and rather stay with the axiom, 20 21
(1)
-'N[W(x. y»).
expressing that it is not necessary that x is wronged by y . Thus . from (I) and (II) we can derive (2 )
-,N[W(x. y) V W (z, -n
but (2) cannot be derived from (1). As will appear, the stronger logic resulting from (I ) and (II ) will yield typologies closer to those proposed by Kanger. 25 Since we have (I ) and (II) among the axioms. we obtain , as well, further theorems for cases where x, y are not kept fixed; in particular . we have. R(x. y. A) - -,R(z, w, -,A ). 26 The antecedent of (2) is equivalent to N(-,Do(y. F) - W(x . y» which implies N(.,F - W(x. y». From this formula and III we get N[Do(x. -'F) - Do(x, W(x . y»); using IV we get N( Dotx, "F) - W(y, x». which is equivalent to the consequent of (2). 27 B. Hansson (1970 ). at pp. 245 f. 28 For an approach closerto Hohfeld 's than Kanger 's, see. as well, B. Hansson (1970 ); cf. also Makinson (1986 ). at pp. 48 ff.
REFERENCES Anderson , A. R.. The Formal Analysis of Nonnative Systems. Technical report N:o 2. contract N:o SARInonr-609 (16), Office of Naval Research. Group Psychology Branch. New Haven, Conn. 1956. (Reprinted in Rescher (1967). at pp. 147-213.) Anderson , A. R.• "Logic. Norms and Roles". Ratio 4 (1962). pp. 36 -49. Anscombe, G. E. M.• "Who is Wronged?" The Oxford Review (1967) . Barcan Marcus, R.,"lterated deontic modalities ". Mind 75 (1966), pp. 580 - 582 . Danielsson, S.. Filosofiska inviindningar. Stockholm 1986. Fitch , F. B.. "A Revision of Hohfeld's Theory of Legal Concepts", Logique et Analyse 10 (1967 ), pp. 269- 276. Golding, M. P., "The Significance of Rights Language" , Philosoph ical Topics 18 (1990 ), pp. 53 -64. Hansson . B.. "Deontic Logic and Different Levels of Generality". Theoria 36 (1970). pp. 241 248. Hansson, S. 0 ., "Individuals and collective actions", Theoria 52 (1986 ). pp. 87 -97. Hansson, S. 0. , "A formal representation of declaration-related legal relations". Law and Philosophy 9 (1990 -91). pp. 399 -416.
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Hart, H ., "Bentham on Legal Rights ", in Oxford Essays in Jurisprudence , Second Series, ed . A. W . B. Simpson, Oxford 1973, pp . 171-201. Hilpinen, R., ed ., Deontic Logic: Introdu ctory and Systematic Readings, Dordrecht 197 I. Hohfeld, W . N., Fundamental Legal Conceptions As Applied in Jud icial Reasoning, and Other Legal Essays, ed . W. W . Cook, New Haven 1923. Holrnstrom-Hintikka, G. , Action, Purpose, and Will: A Formal Theory. Helsinki 1991. Hughes, G. E. and Cresswell, M . J., An Introduction to Modal Logic. London 1968. Kanger, H., Human Rights in the U. N. Declaration . Acta Universitatis Upsaliensis, Uppsala
1984. Kanger, S ., New Foundation s for Eth ical Theory . Part I. Stockholm 1957. (Reprinted, with minor changes, in Hilpinen (1971).) Kanger, S ., "Rattighetsbegreppet'' ("The Concept of a Right") , in Sju Filosofiska Studier tilldgnade Anders Wedberg den 30 mars 1963. Philosophical Studies published by the Department of Philosophy, University of Stockholm; N:o 9, Stockholm 1963. (Reprinted, in English translation, as the first part of Kanger & Kanger (1966». Kanger, S ., "Law and Logic", Theoria 38 (1972), pp. 105-132. Kanger, S ., " Nagra synpunkter pa beg reppet inflytande" ("Some aspects of the concept of influence") , in Filosofiska Smulor tilliignade Konrad Marc-Wogau . Filosofiska Studier utgivna av Filosofiska Foreningen och Filosofiska Institutionen vid Uppsala Un iversitet, Uppsala 1977. Kanger, S ., "On Realization of Human Rights", in Action, Logic, and Social Theory, cd . by G. Holmstrom and A. J. I. Jones, 38 Acta Philosophica Fenni ca (1985), pp . 71- 78. Kanger, S., "Unavoidability" , in Logic and Abstraction. Essays Dedicated to Per Lindstrom on His Fiftieth Birthday, cd. M . Furberg et aI., Goteborg 1986. Kanger, S. & Kanger, H. "Rights and Parliamentarism", Theoria 32 (1966), pp . 85-116. Lindahl, L., Position and Change: A Study in Law and Logi c, Dordrecht 1977. MacCormick, N., Legal Right and Social Democracy . Oxford 1982. Makinson, D ., "On the formal representation of rights relations. Remarks on the Work of Stig Kanger and Lars Lindahl" , Journal of Philosophy 15 (1986), pp. 403-425. Mill , J. S., Utilitarianism, Liberty, Representative Government. Everyman' s Library. London 19IO (repr. 1964). Opfermann, W ., "Zur Deutung normlogisch er Metaoperatoren " , In Deontische Logik und Semantik, cd . by A. G . Conte et al. Wiesbaden 1977. Porn, I., The Logic of Pow er . Oxford 1970. Porn, I., Elements ofSocial Analysis . Filosofiska Studier utgivna av Filo sofiska Foreningen och Filosofiska Institutionen vid Uppsala Universitet. Uppsala 1971. Porn, I., "Some basic concepts of action" , in Logical Theory and Semantic Analysis, ed . by S . Stenlund, Dordrecht 1974, pp . 93-1OI. Porn, I., Action Theory and Social Science, Dordrecht 1977. Rescher, N., ed ., The Logic of Decis ion and Action , Pittsburgh 1967. Stevenson, Ch . L., Ethics and Language. New Haven 1944. Szewak, E. 1., "Iterated modalities and the parallel between deontic and modal logic", Logique et Analyse 67-68 (1974), pp . 323- 333. Tuck, R., Natural Rights Theories: Their Origin and Development. Cambridge 1979. Talja, J. "A technical note on Lars Lindahl's Po sition and Change", Journal of Philosophical Logic 9 (1980), pp . 167-183 . White, A. R., Rights. Oxford 1984. Wright, G.H. v; An Essay in Deontic Logic and the General Theory of A ction . Amsterdam
1968.
LENNART AQVIST
STIG KANGER'S THEORY OF RIGHTS : BEARERS AND COUNTERPARTIES, SOURCES-OF-LAW, AND THE HANSSON PETALUMA EXAMPLE
1. INTRODUCTION In spite of the many conspicuous virtues of Stig Kanger's well-known theory of rights, as presented e.g. in Kanger (1957), Kanger & Kanger(1966), Kanger (1972), and also in Lindahl (1977, Chapter 1), there are quite a few intriguing problems connected with that theory, especially when it is considered from a legal or juristic point of view. Some of these problems have been very ably discussed in two fairly recent important contributions, viz. Makinson (1986) and Lindahl (1994). For instance, they are both concerned with the difficulty, on Kanger's approach, of capturing the "full Hohfeldian relationality" involved in rights relationships (Hohfeld (1919) was concerned not just with claims and duties simpliciter, but with claims held by yon x, and duties borne by x towards y, with regard to specified states of affairs). Already Hansson (1970) dealt with this type of difficulty as a problem for so-called deontic logic, although without explicitly relating it to Kanger's theory of rights; but Hohfeld (1919) forms the starting point of his paper. Following Makinson's terminology, we shall refer to this problem as the task of finding a suitable double indexation for bearer and counterparty in the formal representation of a rights relationship. The main purpose of the present paper is to outline a new way of handling the problem. The plan of the paper is as follows . In Section 2 infra we present the afore-mentioned difficulty for Kanger's theory, and in Section 3 we diagnose it as arising from failure of the theory to pay explicit attention to socalled sources-of-law, which are, of course , all-important to lawyers and legal scientists alike. On the basis of this (alleged) insight we then propose, in Section 4, a new formalism for representing rights relations, which will be an extension of Dyadic Deontic Logic, i.e. a logic for conditional obligation and permission; the formalism will also have to contain notation both for sourcesof-law and their application to various agents, or persons, e.g. parties to a contract. Section 5 supplies a series of definitions, which will be put to work
173 G. Holmstrom-Hintikka , S. Linstrom and R. Slivinski (eds.), Collected Papers ofStig Kanger with Essays on his Life and Work. Vol. II. 173-183. © 2001 Kluwer Academic Publishers. Printed in the Netherlands.
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in the concluding Section 6, where we deal in some detail with an interesting example due to Hansson (1970 ). Our source-of-Iaw approach to the double indexation problem can be seen to differ from the approaches of Makinson (1986) and Lindahl (1994) in the following important respect: their informal explications of such locutions as x bears a duty towards y that F under the code N x has a claim-right versus y to the effect that F(x,y)
(Makinson) (Lindahl)
are both in terms of what happens in the case that F is not true / if F(x,y) is not the case, viz. for Makinson: that y has a power under N to initiate legal action against x for non-fulfillment of F, and for Lindahl: that x is wronged by y. Thus, their explicata both refer to certain legal consequences of breaking the duty / violating the claim-right at issue. On the other hand , my own explications below of those locutions rather refer to certain legally relevant (conditioning , operative, ultimate) facts, viz. that there exist valid sources-of-Iaw, which apply to the parties x and y , and according to which x has that duty to y/ x has that claim-right against y. The distinction legally relevant fact vs. legal consequence is a well-known theme in Scandinavian jurisprudence of this century; see e.g. Wedberg (1951) . It corresponds closely to the Alchourron & Bulygin (1971 ) distinction Case vs. Solution. My emphasis in this paper on sources-of-Iaw as legally relevant facts on which rights and duties are based, so to speak, is not intended as a criticism of the Makinson - Lindahl emphasis on legal consequences. Both aspects are clearly important; but the importance of the source-of-law aspect must not be underrated. 2. A CURIOUS DIFFICULTY IN KANGER'S THEORY OF RIGHTS Kanger's explication of the notion of a claim, or a claim-right, results from the addition to his formal language of a definitional schema of the form : Dl.
Claim(x,y,A)
~
ShallDOyA
where x, yare variables over agents, or parties, A is any formula denoting a state of affairs, Shall is a one-place impersonal deontic operator for oughtness (obligation), and where DO is Kanger's operator for "sees to it that". Following Lindahl (1977 , p. 45 f.), we may take as an instance of the definiens here the statement (1)
Smith shall see to it that Jones receives White's bankbook
where we set y
= Smith and A = "Jones receives White's bankbook". Again ,
STIG KANGER'S THEORY OF RIGHTS
175
setting x =Jones, we obtain as an instance of the defin iendum in D1 the statement (2)
Jones has versus Smith a claim that Jones receives White 's bankbook
And, if we set x = White, we obtain as an instance of that definiendum the statement (3)
White has versus Smith a claim that Jones receives White's bankbook
Now, as observed by Lindahl (1977, p. 46), since (1) is the explication both of (2) and of (3) according to Dl, (2) and (3) tum out to be equivalent in Kanger's theory. On the other hand, according to common legal usage, they are not equivalent: (3) might well be true, whilst (2) is not (see e.g. Hart (1973), p. 195). Clearly, this is a strange consequence ofDl. The present objection to the adequacy of the Kanger explication of Claim can be sharpened as follows . Suppose that Kanger's theory of rights is formulated in an extension of standard first-order quantificational predicate logic, as it obviously appears to be in Kanger (1957) and Kanger (1972) . (Such a formulation is clearly required, if one is to do justice e.g. to the distinction right in personam / right in rem, which important distinction is elaborately and extensively discussed in the later part of Hohfeld (1919) .) Then, we easily obtain as a consequence of D1: Tl.
Claim(x,y,A) ~ 'izClaim(Z,y,A) ;
where the variable z is distinct from both x and y and is not free in A.
If the equivalence in Kanger of (2) and (3) was a strange consequence of D1, the present result T1 is an even stranger one: it enables us to infer from (3) that anybody has versus Smith a claim that Jones receive White's bankbooknot only the "favoured party" Jones , but even anyone having no dealings whatsoever with White, Smith, Jones or the bank involved. What has gone wrong here with Kanger 's theory in relation to current legal usage of "claim" and "claim-rights"? 3. DIAGNOSIS : THE NEED FOR TAXING SOURCES-OF-LAW INTO EXPLICIT ACCOUNT Let us reflect for a moment on the reason why the statements (2) and (3) fail to be equivalent in many jurisdictions (as observed by Hart (1973), p. 195).
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The reason could be that, whereas there exists a valid source-of-law which applies to the parties White and Smith (say , an agency agreement with Smith the agent and White the principal) and according to which Smith has a duty to White to transfer White's bankbook to Jones, there does not exist any valid source-of-law applying to Jones and Smith according to which Smith has that duty to Jones. So (3) is true by virtue of the valid source-of-law applying to White and Smith, while (2) is false because of the non-existence of any valid source-of-law applying to Jones and Smith that could make (2) true. On the basis of this explanation, which we take to be basically sound, the following amendment of Kanger' s formulations suggests itself: append to the statement (3) the clause "which is based on the valid source-of-law SL that applies to White and Smith"; and append to the statement (2) the clause "which is based on the valid source-of-law SL that applies to Jones and Smith". (In these appendages, the relative pronoun "which" refers back to "claim", not to "White' s bankbook", of course.) Note that these amended formulations immediately provide an identification of bearer and counterparty in a rights relationship. We recall that such an identification is an important concern of e.g. Makinson (1986) and Lindahl (1994). Moreover, our above explanation why it may be that (3) is true, whilst (2) is false, can now be articulated more clearly as follows : it is easy to find and point out a value of SL which makes the amended formulation (3) true, say, the supposed agency agreement between White and Smith, whereas it might be impossible to find a value of SL making the amended (2) true .
=
=
4. A NEW FORMALISM FOR REPRESENTING RIGHTS RELATIONS: AN EXTENSION OF DYADIC DEONTIC LOGIC How is Kanger's D 1 to be modified, if we adopt the "source-of-law" approach just outlined? To begin with, I suggest that his three-place relation Claim, relating two parties to a state of affairs , be replaced by a four-place one, which relates two parties and a state of affairs to a source-of-law. Our definiendum would then be, instead of the one in D I: Claim-BasedOn(x,y,A; SL) to be read as "x has versus y a claim that A, which is based on the valid sourceof-law SL that applies to x and y" . The "amended" formulations of (2) and (3) considered above would then instantiate this new definiendum. The question how to reformulate the definiens of D 1 is more tricky. We can let SL to a binary relation symbol such that Slxy
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is a well-formed formula which asserts that the valid source-of-law SL applies to the parties x and y . SLxy should then go into the new deflniens as a conjunct; but how do we relate it to the old deflniens ShallDOyA? For a number of reasons that will not be discussed here , I do not think that taking it to strictly imply the latter will yield the best analysis of source-of-law-based claimrights. A more promising course is, in my opinion, to let the new deflniens contain a clause to the effect that the state of affairs SLxy "requires" that DOyA in the sense of Chisholm (1964). In tum, as argued in my Aqvist (1998), the logic of Chisholm's notion of requirement is nothing but a dyadic deontic logic for conditional obligation. In the present context we take its basic formal locution to be Shall(A / B) to be read as: "it shall (ought to) be the case that A, if (given that) B". We can now re-formulate Kanger's Dl in this way : Dl *. Claim-BasedOn(x,y,A ; SL) - SLxy & Shall(DOyA / SLxy) the deflniens of which is read as: "the valid source-of-law SL applies to x and y; and it shall be that y sees to it that A , if (given that) SL applies to x and y" . Upshot: in what follows we are going to use as our formalism for representing rights/duties relations a language of temporally relative modal and deontic predicate logic with, at least, quantifiers and variables over agents, times and sources-of-law as well as matching names (constant symbols), plus the action operator DO (for agent-causation), the dyadic deontic operators Shall( /) (for conditional obligation) and May( / ) (for conditional permission), together with appropriate alethic modal operators (e.g. for historical necessity or, as Kanger calls it, unavoidability). Without entering on a detailed study of the logic I have in mind, we just observe that it will combine features and ideas from Aqvist & Hoepelman (1981), van Eck (1981), Bailhache (1993) and Aqvist (1998) . 5. A SERIES OF DEFINITIONS Given a formal language of the sort just outlined, we now propose a ser ies of definitions, or definitional schemata, which are to be added to an axiomatic formulation of the logic mentioned in the preceding section. In them, x, y will be variables over agents (parties), A, B will be any formulas (thought of as referring to states of affairs, as in Kanger), and SL will be a variable ranging over sources-of-law (assumed to be valid in whichever jurisdiction is under consideration).
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D2.
LENNART AQVIST
CondDuty-BasedOn(x,y,A,B; SL) SLxy & Shall(DOxA/B & SLxy)
~
Here, the definiendum is to be read as: "x has versus y a conditional duty that x sees to it that A. given that B. based on the valid source-of-Iaw SL that applies to x and y"; and the definien s as "SL applies to x and y; and it shall be that x sees to it that A, given that B and that SL applies to x and y". D3 .
CategDuty-BasedOn(x,y,A; SL) SLxy & Shall(DOxAIT & SLxy)
~
where the definiendum has this reading: "x has versus y a categorical (or unconditional) duty that x sees to it that A. based on the valid source-of-Iaw SL that applies to x and y" . The defini ens of D3 is read as in the case of D2 , except that we have a "designated" tautology T (verum) in the place of B. Thus, we obtain D3 from D2 by exploiting the familiar device of defining categorical (unconditional, "peremptory") duties in terms of conditional ones by means of the propositional constant verum . Note that the relation CategDuty-BasedOn is a "merely" four-place one. whereas CondDutyBasedOn is a five-place relation. On the basis of D2 and D3. two obvious notions of a claim (claim-right) readily suggest themselves: D4 . D5.
CondClaim-BasedOn(x,y,A,B ; SL) ~ SLxy & Shall(DOyA/B & SLxy) CategClaim-BasedOn(x,y,A; SL) ~ SLxy & Shall(DOyA/T & SLxy)
The readings of these definienda are straightforward: in the case of D4: "x has versus y a conditional claim that y sees to it that A, given that B, based on etc .", and in the case of D5: "x has versus y a categorical claim that y sees to it that A. based on etc.". We then have the following results. asserting correlativity in the Hohfeld sense : T2. T3.
CondClaim-BasedOn(x,y,A ,B ; SL) ~ CondDuty-BasedOn(y,x ,A,B; SL) CategClaim-BasedOn(x,y,A; SL) ~ CategDuty-BasedOn(y,x,A; SL)
Apart from the definitions D2- D5, the only additional assumption needed in the proofs of T2 and T3 is one to the effect that the involved source-of-Iaw relation SL is symmetric, i.e.• that for any agents x and y,
STIG KANGER'S THEORY OF RIGHTS
SLxy
~
179
SLyx
which assumption seems uncontr oversial and can be adopted as an axiom. A familiar manoeu vre, enabling us to reduce the number of free variables in definitions D2 - D5 by one, is the following: prefi x each defini ens with an existential quantifier :JSL ("there is a valid source-of-law SL such that "), and delete the variable SL in each definiendum as well as the rider BasedOn; call the resulting series of definitions D2*-D5 *. The first two members of that series will then look like this: D2*. D3 *.
CondDuty(x,y,A,B) ~ :JSL(SLxy & Shall(DOxA/B & SLxy» CategDuty(x,y,A) ~ :JSL(SLxy & Shall (DOxAIT & SLxy»
and so on, in like manner, for the remaining two resultin g definitions. Analogues of T2 and T3 are immediate for the new notions of conditional! categorical duties/claims. Various further definitions might be added to our form al framework. For the time being, let us cont ent ourselves with ju st two new items: D6. D7.
CondPriv-BasedOn(x,y,A,B; SL) ~ SLxy & May(DOxA/B & SLxy) CategPriv-B asedOn(x,y,A; SL) ~ SLxy & Ma y(DOxAIT & SLxy)
the readings of which should be obvious , except possibly that Priv suggests "privilege" in the Hohfeld sense of "permission" . 6. HOW TO HANDLE BENGT HANSSON'S PETALUMA EXAMPLE IN OUR FRAMEWORK The Hansson (1970) Petaluma example runs as follo ws. Petaluma, Calif., is an area of private property , where different parts are owned by different people. Now, every lando wner in Petaluma has forbidden x to walk on his (the landowner's) land ; on the other hand , no lando wner in Petaluma has the power to (' can') forbid x to walk on land owned by others in Petalum a. For simplicity, assume that there are exactly three landowners in Petaluma, viz. a, b, and c, which are all distin ct from x (and from one another). We shall deal with the que stion how to characte rize x's position with regard to these lando wners , using the conc ept s defined in the last section. First of all, let us introduc e a bit of formal notation and write:
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LENNART AQVIST
W.xy /Wxa, Wxb, Wxcl for "x walks on y's la's, b's, c's/land",
and Wx
for
"x walks on private land in Petaluma".
Moreover, we shall write SLl for SL2 for
"the source-of-law constituted by a having prohibited x from walking on a's land, but not on b's or c's"; "the source-of-law constituted by b having prohibited x from walking on b's land, but not on a's or c's";
and SL3 for
"the source-of-law constituted by c having prohibited x from walking on c's land, but not on a's or b's".
We can now state three unproblematic assumptions, or axioms, governing the Petaluma example (where the variable y ranges over the landowners): Al , A2.
A3.
Vy(y=aVy=b Vy=c) Wx ~ (Wxa V Wxb V Wxc) SLlxa & SL2xb & SL3xc
~
:3yW.xy
Consider next the following four statements:
(4) (5) (6) (7)
Vy :3SL CategOuty-BasedOn(x,y,-'W.xy; SL) :3SL Vy CategOuty-BasedOn(x,y,-,W.xy; SL) Vy :3SL CategOuty-BasedOn(x,y,-'Wx; SL) :3SL Vy Categljuty-BasedOrnxw-wx: SL)
We then consider each of these statements in tum, with a view to finding out its truth-value. Ad (4). As every landowner in Petaluma has forbidden x to walk on his land, we have the following results: SLlxa & Shall(OOx -,Wxa/ SLlxa) SL2xb & Shall(OOx -rt Wxb/ SL2xb) SL3xc & Shall(OOx -'Wxcl SDxc)
From these assumptions, true ex hypothesi in the example, we easily derive (4), which must then be true as well (for the derivation, use definition 03, axioms Al and A3, predicate logic, and our logic for dyadic deontic operators). Again, appealing to 03*, we may conclude from (4) that x has a categorical
STIG KANGER'S THEORY OF RIGHTS
duty versus every landowner not to walk on his land, formally:
CategDuty(x,y,""Wxy).
181
vv
Ad (5). Familiarly, (5) is a stronger statement than (4), so the truth of (4) does not preclude (5) from being false . For what does (5) assert? It asserts that there is a single, valid source-of-law SL such that:
SLxa & Shall(DOx ...,Wxal SLxa) SLxb & Shall(DOx ...,Wxbl SLxb) SLxe & Shall(DOx ..., Wxc/ SLxe) Clearly, none of SLl , SL2 or SL3 could serve as the desired SL here: SLl, for instance, satisfies the first clause but fails to satisfy the second and the third one, and similarly for SL2 and SL3. In general, even if there were an SL of the desired sort (applying to all of x.a.b,c and prohibiting x from walking on any of the different parts of Petaluma land), its existence and validity certainly does not follow from the truth of (4) in our example. So we might well deem (5) false.
Ad (6). First of all, we must observe here that the relevant clause in (6), ...,Wx ("x does not walk on private land in Petaluma"), is stronger than ...,Wxy ("x does not walk on y's land in Petaluma"), which clause figured in (4) and (5). In effect, by the axiom A2 , ...,Wx is equivalent to the conjunction (...,Wxa & ...,Wxb & ""Wxe). Moreover, according to the premisses of the example, no landowner in Petaluma had the power to forbid x to walk on land owned by others in the area: x's walking on such a land is no concern of any given landowner, who worries only about his own land . We can express this assumption as follows in our formalism: A4.
SLlxa & May(DOxWxbISLlxa) & May(DOxWxc/SLlxa) SL2xb & May(DOxWxaISL2xb) & May(DOxWxc/SL2xb) { SL3xe & May(DOxWxaISL3xe) & May(DOxWxbISL3xe)
A more compact way of expressing A4 is the following:
'tIy'tlz(u y -
3SL CategPriv-BasedOn(x,y, Wxz; SL»
where the four-place relation in the scope of the existential quantifier is defined by D7 supra. Let us now go back to the statement (6) . Since ...,Wx is intuitively stronger than ...,Wxy, the truth of (4) should not preclude (6) from being false. So the situation of (6) vis-a-vis (4) is similar to that of (5) vis-a-vis (4) just dealt with. However, we may ask: is it possible, using the assumption A4 in particular, to
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prove the negation, or falsity, of the statement (6)? We shall argue that this is indeed the case, provided only that we make the following additional assumption concerning the sources-of-law which are applicable in the context of the present example: A3+.
VSL«SLxa ~ SL=SLl) & (SLxb (SLxc - SL=SL3»
~
SL=SL2) &
Clearly, taken together with A3 supra, A3+ asserts that SLi is the only source-of-law that applies to x and a (in the context at hand), that SL2 is the only source-of-law that applies to x and b, and similarly for SL3 with respect to x and c. An attempted refutation of (6) may run as follows. We start by assuming (6) for reductio ad absurdum, and then go on to derive e.g. SLixa & Shall(.,DOxWxbISLlxa)
which result contradicts the first clause in A4 by virtue of the principle May(AIB)
~
.,Shall(.,AIB)
of our dyadic deontic logic. In the derivation of that result we appeal (i) to the axiom A3+ (in order to get SLlxa ), (ii) to the axiom A2 together with the Kanger- Lindahl rule RI in the logic of DO (in order to be able to replace the clause .,Wx in (6) by the conjunction (.,Wxa & .,Wxb & .,Wxc); see Lindahl (1977 ), p. 68), (iii) to the principle (iii) on p. 76 of Lindahl (1977) asserting distributivity of DOx over conjunction (in one direction; note that this principle is not forthcoming in the Kanger- Lindahl basic , or minimal, logic of DO) and (iv) to their axiom Al (see again Lindahl (1977), p. 68) from which we easily derive the principle: DOx.,A -
.,DOxA
which is needed in our proof. The remaining details can be left to the reader. Before leaving the statement (6), let us just observe that the additional axiom A3 + is also useful in enabling us to refute the statement (5): the latter will then be seen to imply the absurd conclusion that the three sources-of-law SLl , SL2 and SL3 are identical to each other! Ad (7) . Since (7) is logically stronger than (6), and (6) is false , (7) must be false as well.
Upshot : the high ly interesting distinctions, which Hansson (1970), Makinson (1986) and Lindahl (1994) try to bring out in different formal ways, amount in our source-of-law framework to one as between the true statement
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(4) and the false stronger statements (5) -(7). Among the latter three, (6) seems to be the one that best fits the argument of our colleagues; but (5) is an interesting candidate, too. Uppsala University
REFERENCES Alchourr6n, C.E . & E. Bulygin (1971), Normative Systems . WienlNew York, Springer. Bailhache, P. (1993) , "The Deontic Branching Time : Two Related Conceptions," Logique et Analyse 36, 159-175. Chisholm, R.M. (1964), "The Ethics of Requirement," American Philosophical Quarterly 1, 147-153. van Eck, lA. (1981) , A System of Temporally Relative Modal and Deontic Predicate Logic and its Philosophical Applications. University of Groningen, Department of Philosophy. Also in Logique et Analyse 25 (1982), 249 - 290 and 339- 381 . Hansson, B. (1970), "Deontic Logic and Different Levels of Generality," Theoria 36, 241- 248 . Hart, H.L.A . (1973), "Bentham on Legal Rights" in A.W.B. Simpson (ed .), Oxford Essays in Jurisprudence (2nd series) . Oxford, Clarendon Press, pp. 171- 20 1. Hohfeld, W.N . (1919), Fundamental Legal Conceptions as Applied in Judicial Reasoning and Other Legal Essays (edited by W.W. Cook) . New Haven, Yale University Press , 1919 , 1923, 1964. Kanger, S. (1957), New Foundations for Ethical Theory . University of Stockholm, Department of Philosophy. Also in R. Hilpinen (ed.), Deontic Logic: Introductory and Systematic Readings. Dordrecht, Reidel, 1971. Kanger, S. (1972), "Law and Logic," Theoria 38,105 -132. Kanger, S. & H. Kanger (1966) , "Rights and Parliamentarism," Theoria 32,85-115 . Lindahl, L. (1977), Position and Change: A Study in Law and Logic . Dordrecht, Reidel. Lindahl, L. (1994), "Stig Kanger's Theory of Rights" in D. Prawitz, B. Skyrms and D. Westerstahl (eds.), Logic, Methodology and Philosophy of Science IX. Elsevier Science B.Y., pp . 889-911. Makinson, D. (1986), "On the Formal Representation of Rights Relations. Remarks on the Work of Stig Kanger and Lars Lindahl ," Journal of Philosophical Logic 15,403-425. Wedberg, A. (1951) , "Some Problems in the Logical Analysis of Legal Science," Theoria 17, 246-275 . Aqvist, L. (1998), "Prima Facie Obligations in Deontic Logic : A Chisholmian Analysis Based on Normative Preference Structures" in C. Fehige & U. Wessels (eds .), Preferences. Berlinl New York, W. de Gruyter, pp. 135-155. Aqvist, L. & J. Hoepelman (1981), "Some Theorems About a 'Tree' System of Deontic Tense Logic" in R. Hilpinen (cd.) , New Studies in Deontic Logic . Dordrecht, Reidel, pp. 187-221.
GHITA HOLMSTROM-HINTIKKA
STIG KANGER'S ACTIONS AND INFLUENCE
1. INTRODUCTION This essay is mainly historical in character. Thus, a great part of it is devoted to Kanger' s own development of his concepts and theory. For a brief comparison, some aspects of his theory are put in perspective in order to show his originality and influence. This is the case for instance concerning his Dopredicate which is mirrored in Porn's Ii-predicatc for action (1977). One section is also devoted to extensions and further developments of Kanger's action theory . Although undertaken by mysel f and in many respects diverging from his thoughts , these extensions arc to a great extent triggered by my intensive discussions with Kanger in the years of 1980-1987. His influence is also plain in publications by Lindahl (1977) and Porn (1970, 1972, 1977) and Helle Kanger (1966, 1981) as well as by myself (as late as 1997) and others as for instance A. J. I. Jones . This Fenno-Scandian school of Act ion Theory is also being taught in our universities till this very day. 2. BACKGROUND Stig Kanger's Action Theory was gradually developed along with his ethical theory and theory of human rights. Thus, in his early writings such as New Foundations for Ethical Theory (1957) and his essay "Rattighetsbegreppet" (1963) he introduces agent causation through the concept 'that Y causes that S(X,Y)'. Still in the reprinted and extended version of this essay renamed "Rights and Parliamentarism" and written together with Helle Kanger and published in Theoria (1966) we can read among other things that a party Z breaks a rule of rights if it holds either that (1) according to the rule it shall be that Z causes ..., but actually it is not so that Z causes ..., etc. (1966 , pp. 9899). When New Foundations for Ethical Theory is reprinted 1971 in Deontic Logic ed. by R. Hilpinen, as we will see, we then find the action terms familiar from Kanger 's later writings 'Y sees to it that' . Thus the clauses above reads as (1) ... that Z sees to it that ... but actually it is not the case that Z sees to it that ... etc.
185
G. Holmstrom-Hintikka, S. Linstrom and R. Slivinski (eds .), Collected Papers of Stig Kanger with Essays on his Life and Work, Vol. ll, 185-204. © 2001 Kluwer Academic Publishers. Printed in the Netherlands.
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Also, another action concept which plays a key role in several of his writings, the concept of 'unavoidability', enters his thought at an early stage. In New Foundations (1957) he says that 'OughtA' always implies that' -A is avoidable', where avoidability is taken in the wide sense: only such facts are unavoidable which would be or would have been outside the range of reasonable and foreseeingly planned joint human efforts .
As we all know, Stig' s last paper was named "Unavoidability" (Kanger, 1986). In New Foundationsfor Ethical Theory (1957) Kanger discusses the deontic notions 'Ought', 'Right' and 'Wrong' and their relations within a framework of ethical theory . In this context he spells out the content of the schema (Kanger, 1971, p. 42) (0)
X has a right in relation to Y to the effect that F(X,Y)
where X and Yare 'moral personalities' and F(X,Y) is a relation between X and Y. The vagueness of 'X has a right in relation to Y to the effect that' is clearly shown by the four idiomatic instances (1)-(4) of (0) (1) (2) (3) (4)
X has a right to get back the money she loaned to Y. X has a right to walk into Y's shop when it is open. X has a right to give all her money to Y. X has a right to walk on the street outside Y's shop.
The ambiguity in (0) as seen in (1)-(4) reflects the different meanings of 'right' in that "in (1) 'right' means claim, in (2) 'right' means liberty or privilege, in (3) 'right' means power and in (4) 'right' means immunity". When these four senses of 'right' are explicated, in the very explication we see in the first version of 1957 the term cause as in 'Y causes that' whereas in the reprinted version we find action terms familiar from Kanger's later writings 'Y sees to it that'. Thus the alternative meanings of 'right' are explicated as (1 ') (2') (3') (4')
Ought(Y causes that F(X,Y)) Right-(X causes that -F(X,Y)) Right(X causes that F(X,Y)) Ought-t Y causes that -F(X,Y))
In the reprinted version it reads (1/1) (2/1) (3/1) (4/1)
Ought(Y sees to it that F(X,Y)) Right-(X sees to it that -F(X,Y)) Right(X sees to it that F(X,Y)) Ought-t Y sees to it that -F(X,Y))
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187
In this same connection Kanger recognizes that the different senses of Right as well as some other moral notions "cannot be analysed unless such concepts as: It is avoidable for X that, X sees to it that and X can know that, are available" (1971 , p. 43) . Then he simply states that since they are not available in the language L, "we postpone all further troubles to a planned second part of this paper" (Kanger, 1972, p. 43) . Unfortunately this second part never appeared but Kanger did continue to slowly develop a concept of action which can be extracted from his later writings. Let me, however, first go back in time to "Rattighetsbegreppet'' (1963) and "Rights and Parliamentarism" (1966). 3. CAUSING
Being elements of the simple types ofrights agent causation 'that Y causes that S(X,Y)' gets its own explication. The eight types of rights (a) (b) (c) (d)
(a ') (b') (c') (d')
claim freedom power immunity
counter-claim counter-freedom counter-power counter-immunity
(p. 86f.) are given the explication (1a) (1b) (1c) (1d)
X X X X
has has has has
versus versus versus versus
Y a claim that S(X,Y) Y a freedom that S(X,Y) Y a power that S(X,Y) Y an immunity that S(X,Y)
(1966, p. 88). The types (a')-(d ') are expressed in an analogous way. It is in the process of interpreting these explications that we first meet the cause relation in a semi-formalised language: (2a) (2b) (2c) (2d)
It shall be that Y causes that S(X,Y) Not : it shall be that X causes that not-S(X,Y) Not: it shall be that not: X causes that SeX,Y) It shall be that not: Y causes that not-SiX, Y)
For the expression: Not: it shall be that not ... its dual expression is introduced: It may be that ...
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Kanger's familiar examples of the concept of a right may also be used as an example of this relation of causation: It shall be that Y causes that X receives from Y what X has lent to y. It may be that X causes that a manuscript written by X is published in Sweden. I shall in this paper concentrate on the development of Kanger's notion of agent causation, from his first vague expression of 'Y causes that ...' to his action concept as expressed by the 'Do' predicate for 'seeing to it that' and beyond. At an early stage of his concept of 'cause' Kanger himself recognizes its vagueness commenting that it admits "different specifications in different contexts" and that we "shall assume only that they are interpreted in a reasonable way" and that it satisfies certain logical principles (ibid., p. 88). These logical principles are then simply introduced by means of the long arrow ' - ' which denotes the relation of logical consequence: F - G if G follows from F by ordinary logic extended in a suitable way by logical principles for the concepts 'shall' and 'cause' . Note that the relation - is assumed to fulfill principles like (i) if F and if F - G, then G; (ii) if F - G, then not-G - not-F ; (iii) ifF - G and G - H, then F - H. (p. 88, footnote) . As the concepts 'shall' and 'cause' are linked together it may be appropriate in this context to present all five logical principles which they are assumed to satisfy: I. II. III. IV. V.
If F - G, then shall-F - shall-G (shall-F and shall-G) - shall-(F and G) shall-F - not shall-(not-F) IfF - G and G - F, then X causes F X causes F - F
X causes G
(1966 , p. 89). As will be shown later in this paper, when Kanger's essay was translated and republished it had undergone some striking changes and developments. One point concerns agent causation which in the later version occurs in its new form ' seeing to it' . In Kanger's writings one important notion is the one of 'state of affairs'
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(later to be replaced by 'condition'). About this notion he says in 1966 that it "in this essay always means a relation between parties, so that if X and Yare parties S(X,Y) means that the party X stands in the relation S to the party Y". For instance, S may be specified "as the relation between any two parties PI and P2 such that Pi receives from P2 what PI has lent to P 2' Then, of course, S(X,Y) means: X receives from Y what X has lent to Y" . We can note that X or Y need not always occur in S(X,Y) when S is specified (Kanger, 1966, p.89). In the development of the 26 atomic types of rights, the notion of action is imbedded but nowhere actually spelled out. Yet, in discussing the rules of rights and in particular breaking such rules agent causation is immanent. According to an example of a rule of rights it shall be that Y causes that Y does not run into X and, by the strength diagram for rights, it shall be that X does not cause that Y runs into X. Then again, an agent breaks a rule of rights if (1) -(2) hold: (1) (2)
according to the rule it shall be that Z causes ..., but actually it is not so that Z causes ..., according to the rule it shall be that Z does not cause ..., but actually it is so that Z causes ....
(1966, pp. 98-99.) As has been plain , agent causation in the form of causing plays a significant role in the development of Kanger' s types of rights. Nevertheless, so far he has not paid attention to the very conceptual, i.e., semantical aspects of 'causing'. 'Cause' and 'causing' appears as an unanalysed primitive. 4. LINGUISTIC CONSIDERATIONS
In "Law and Logic" we find Kanger' s first extensive analyses of actions. In the very beginning of this article he states that a system of law is "any system of rules which has the purpose of regulating human action under certain conditions" (Kanger, 1972, p. 105). The linguistic framework, later called an Llanguage, he says , should be narrow but should contain sentences by means of which one can (1)
(2) (3)
describe states of affairs or conditions, including numerical conditions state that a state of affairs is unavoidable prescribe that something shall be, or ought to be, the case
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(4) (5)
GHITA HOLMSTROM-HINTIKKA
state that an agent , i.e., a person or an ordered set of people, does something or sees to it that something is the case state that an agent decides upon a certain state of affairs
(1972 , p. 106). A few more points are listed on the wish list but are more related to systems of law and can be neglected in this context. As to the codification, Kanger assumes that "sentences of type (1) can be formulated within the framework of the language of many-sorted elementary logic extended by elementary algebra. "The language of many-sorted elementary logic", he says, "differs from the usual one-sorted type due to the fact that it has several kinds of individual variables". He assumes that there are at least four kinds : variables
x, y, z,... r, s, t,... a, b, c,... p, q,...
for for for for
things time numbers people (or agents regarded as units).
The sentences of type (2) are formed by means of the modal operator it is unavoidable that. Type (3) sentences in tum are formed by means of the deontic operators ought and shall. Greek letters, a,~, ..., stand for a sequence of person variables. For instance, a can be p, or pq, or qpq etc. Thus sentences of type (4) are formed by means of the operators a sees to it that and a sees to it at t that. In an analogous way sentences of type (5) are formed with the operators a decides that and a decides at t that (1972, p. 107). Some of the operators introduced can be analysed in terms of more basic operators. This is the case with the operator seeing to it: (Def)
a sees to it that (---) is per definition the conjunction: (---) is necessary for something which a does and (---) is sufficient for something which a does.
(1972, p. 108). 5. DEDUCTIVE DEVELOPMENT Kanger introduces a set of abbreviations and notions among those directly connected to actions which are from our perspective the important ones (F, G, H are letters for formulas in the L-language) (1972 , pp. 108-109):
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STIG KANGER 'S ACTIONS AND INFLUENCE
Do(«r, Do( a,t, F) Do(«r, Do(a,t,F)
for for for for
F is necessary for something a. does F is necessary fo r something a. does at t F is suffic ient for something a. does F is sufficient for something a. does at t.
The previously stated definition can now be written as (Defl) Do(a,F) = df Do(a ,F) & Do(a,F) (Def2) Do(a,t,F) =dfDo(a,t,F) & Do( a,t,F) The more frequently used variants are the ones where the time component is ignored. Two rules of inference (I -II) are con sidered along with a set of formulas (1)-(5) where 0 is a general letter for any of the operators above: I II
If I-F , then 1-0 F. If I-(F '= G), then I-(OF '= OG) .
1. 2. 3. 4. 5.
OF & O(F ::> G) ::> OG. OF & OG ::> O(F & G). O(F & G) ::> OF & OG. OF ::>F. OF ::> -O-F
(1972, p. 109) . As we can read from Kanger' s tabl e these rules and formulas are taken to be valid for Do and Do to the following extent
I
Do Do
II
2
II
2
3
4
5 5
Thus, if Do(a,F) expresses what the agent do es we can easily infer that the rules and formul as are val id only as to Do(a,F)
II
1
2
This is to say II
If I-(F '= G), then I-Do(a,F) '= Do(a,G).
1. 2. 5.
Do( a,F) & Do(a,F ::> G) ::> Do(a,G) Do(a,F) & Do(a,G) ::> Do(a,F & G) Do(a,F) ::> -Do(a,-F)
It is also believed that the following formulas are valid Do(a,F) & DOCa,G)
::> Do(a,
(F V G))
5
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GHITA HOLMSTROM-HINTIKKA
Do(a,r,F) & r < t
::> Unav-Do(/U,-Do(a,r,F)
.
(For a complete list of formulas assumed valid see Kanger, 1972, p. l l Of.) The concept of unavoidability also gets structured in this paper in that all the rules and formulas (1- II) and (1)-(5) are considered valid for UnavF (it is unavoidable that F). Moreover, Unavf' > -Do(a,F) UnavDo(a,F) ::> -Ought-Do(a,F) OughtDo(a,F) ::> -Unav-Do(a,F) Unav(F = G)::> OughtF = OughtG Unav(F = G)::> Do(a,F) = Do(a,G). This concept is analysed in detail in his last paper, "Unavoidability" (1986) and I shall return to this in that connection. In a comparison to other attempts in the direction of structuring the operator seeing to it Kanger takes us to Chellas (1969) and Porn (1970, 1971). The difference between his operator and the one of Porn's he says is that Porn 's theory "contains an inference rule of type I for the operator seeing to it, thus identifying it with our 06 rather than with Do". A comparison with Porn (1977) is in place here. The basis for Porn 's concept of action is a possible world semantics in terms of which he defines his concept E(a,p) as a conjunction of two other concepts, Dta.p) and C'(a.p) which are two of his basic concepts (Porn uses the notation EaP, DaP, CaP, etc., where a is the name of the agent). Translated into the terminology used in this work, Porn 's basic concepts may be written as follows: D(a,p) = it is necessary for something which a does that p. (p. 4) D'(a.p) = but for a's action , it would not be the case that p. (p. 5) C(a,p) = it is compatible with everything that a does that p. (p. 7) C'(a.p) = but for a's activity, it might not be the case that p. (p. 7) An alternative reading for D'(a.p) is: p is dependent on a's action, whereas C'(a.p) may be read as: p is not independent of a's action . The connection between these concepts Porn defines (p. 6) as follows: (Dfl) (Df2)
C(a,p) =-Dta.-p) C'(a,p) = -D/(a,-p)
After this, Porn gives the following definition of a's action : (DO)
E(a,p)
=(D(a,p) & C/(a,p»
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STIG KANGER 'S ACTIONS AND INFLUENCE
The reading of (Dfl) is the same as for C(a,p) above, and the reading of (Df2) as for C'(a.p). E(a,p) stands for the sentence "a brings it about that p" (p.7). 6. SEMANTICS
In his semantical discussion Kanger first gives a brief account of well-known semantic theories (1972, p. I 12ff.). This account , however, is strongly limited to the language of classical two-valued elementary logic. Not only does he rule out, and rightly so, intuitionistic logic and many-valued logic, he also limits himself to one-sorted logic without symbols for operations in the domain of individuals. What we find, then, is an expansion of Tarski type theory "with the purpose of obtaining semantics for modal formulas" (p. 114). I shall not go into this in detail here. (The interested reader is advised to see Kanger, 1972, pp. 114-115 also reprinted in Vol. I of this edition.)
6.1 Semantics for Some Operators in Language L The semantics for D6(p, F) and Do(p,F) can be constructed in Kanger's theory as follows: T(D6(P, F) , (U, W; V)) RDoCV(p, U), U ~ U),
=tiff T(F, (U ~ W, V)) =t for all U
I
such that
where RD6 is a 3-place relation such that RD6( V(p,U), U ~ U) means that everything the person V(p,U) does in U is the case in U ~ We should note that "the assignment V of values to the variables applies to person variables as well as to individual variables of other sorts" (1972, p. 121). In a similar way Kanger gives the semantics for sufficiency, Do: T(Do(P,F), (U, W, V)) RDi>(V(P,U), U ~U),
=tiff T(-F, (U ~ W; V)) =t for all U
I
such that
where RDoCV(p, U), U ~ U) means that the opposite of everything V(p, U) does in U is the case in U ~ RDoCV(p, U), U ~ U) and (::JU JRDi>(V(p, U), U ~ U) are assumed to always hold true . Action at time t, Do(p,t,F), has an analogous semantics (1972, p. 121).
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GHITA HOLMSTROM-HINTIKKA
7. ACTIONS IN GENERAL In his general remarks about actions Kanger starts with pointing out three distinctions which need to be made - but which are not always so made (1972, p. 122): (1) Act-Acting. An act is an action expressed by a noun phrase ; for instance, moon-walking, murder, ice-dancing. Acting is action expressed by a sentence; for instance, P walks on the moon, P kills someone, p and q dance on ice. (2) Acting - Pseudo-acting. Acting involves some sort of activity performed by an agent; for instance, p walks on the moon. Pseudo-acting does not have to involve activity; for instance, p and q, p did not kill anybody . (3) Acting - Instances of acting. A type of acting is acting regardless of time; for instance, p and q dance on ice. An instance of acting is acting at a certain time; for instance, p and q are dancing on the ice at time t. Since there are all sorts of borderline cases, the distinction needed is the one between acting (in general) and instances of acting (at a particular time t); for instance p takes his morning walk. In addition to these three distinctions Kanger points out three other main problems which need more attention than what usually has been given : the characterization problem for acting, the elimination problem for acts and the identity problem for acts. The characterization is given in the theoretical framework of language L. Kanger says that "a formula F without occurrences of person names expresses an n-person acting if and only if there is a choice of n person variables p\, ....p; such that (P1)"'(Pn)(F = Do(p],..·,Pn,F» & (~PI) · · ·(~Pn)(PI,· .. -P« are distinct & F)
is true" (p. 123). (For further qualifications and distinctions also see p. 123.) The elimination problem for acts concerns noun phrases denoting acts. The phrase denoting an act is put in a standard form. For instance 'ice-dancing' will be rephrased in standard form as 'the act done by every P such that P dances on ice' (see further 1972, p. 124). The elimination problem is easily solved also in modal contexts such as 'sailing is necessary'. This is reduced to either (P)N(P does sail) or N(P)(P does sail). The identity problem for acts concerns the question "when are acts identical?" At this stage Kanger simply says that this problem does not arise in the
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language L, unless it is extended with for instance variables and quantifiers for acts and predicates and relations of acts . This is, however, not being done in this context. (Later on, in "Unavoidability" the identity for actions is defined. ) In this thorough article "Law and Logic" Kang er returns to earlier explications for rights and takes the full move into the language L. In this framework the explications can be formulated as in for instance the following (p. 125): (1)
(2)
a has a claim again st ~ with respect to F iff Shall Do(~,F) a has a power against ~ with respect to F if and only if May Do(O"F).
The action operator, Do for see to it has a structure not present in Kanger's previous presentations but now it has come to stay. The rights relations shall be bypassed in this paper. 8. INFLUENCE
8.1 'Infl uence' introduced The first signs of an analysis for ' influence' are visible in "Law and Logic". Kanger says that this notion seems similar to that of a right. Thus, we may distinguish simple types of influence which a part y may have in relation to another party with respect to a state of affairs or condition. By replacing Shall by Unav, and May by Can = -Unav- we can express the different influence types , he explains: (1 )
(2) (3)
being forc ed: a is said to be forced in relation to ~ to F if Unav Do(o',F) having power: a is said to have power in relation to ~ with respect to F if Can Do(o',.F) irresistibl e power: a has irresistible power in relat ion to ~ with respect to F if and only if Can Do(O"F) & Unav-Do(~ ,-F)
The last clau se, (3), corresponds to the combination of power and immunity. (For further details see 1972, p. 127.) Kanger does not proce ed with a fullblown anal ysis of influence in this paper. The first signs of second-order action can, nevertheless, be seen very briefly as a distinction connected to "the overlapping of the Do-operator" (p. 127). The distinction concerns 'power in relation' to a party and 'power over' a party.
196
Def
GHITA HOLMSTR0M-HINTIKKA
The party a is said to have power over the party F if Can Do(a,Do(~,F))
~
with respect to
Yet another matter is that of exercising power: Def
a is said to exercise power over
~
with respect to F if Do(a,
Do(~,F)).
This in turn may be distinguished from the influence a exercises over ~ with respect to F when Do(a,Can Do(~,F)) etc.
8.2 Revision of 'Influence' In a later paper, "Nagra synpunkter pa begreppet inflytande" ("Some Aspects on the Concept of Influence") (1977), Kanger returns to his thoughts in "Law and Logic". But now this concept of 'influence' undergoes an extensive revision as does the concept of action . The starting point is now the notion Possible and See to it that. By means of these operators types of influence may be analysed, analogously to types of rights . Thus the influence type Capacity tFormaga) may be interpreted as follows: X has in relation to Y an influence of type capacity with respect to S(X,Y) is synonymous to It is possible that X sees to it that SeX,Y) (Kanger, 1977, p. 12). The possibility in this context means practical possibility, says Kanger. In what then follows, the earlier approach to ' influence' (Kanger, 1972) is radically revised due to his further development of the action operator see to it that but more importantly to a further analysis of 'practical possibility' . For a comparison let me mention that the concept of 'practical possibility' was later by myself developed far beyond Stig 's analysis , yet starting from the modal notion of possibility. As this modal operator is then relativized to an agent I consider the notion ::JmM(x,E(x,m,r)) the equivalent of practical possibility. The interpretation for the formula is: there is some means m such that it is possible for x to see to it that r by means of m. (Holmstrorn-Hintikka, 1991)
STIG KANGER'S ACTIONS AND INFLUENCE
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9. SEE TO IT THAT
See to it that is an action operator which is now (in Kanger, 1977) developed into a three-place relation. When X sees to it that the state of affairs S is the case, then it is reasonable to assume that X sees to it that S by some means (or with the help of) which in the frame of the order of nature and society leads to it that S becomes the case. I The interpretation of the statement X sees to it that S is synonymous to There is some means A such that X sees to it that S by means of A. 2 For instance if X sees to it that the lamp is lit then X sees to this by turning the switch. The means can, but need not, be an active action. If the lamp is already lit then X can see to it that it remains lit by e.g. keeping somebody from turning it off. But if nobody tries to switch it off then X's means consists in remaining prepared to intervene - should somebody try.' In this paper on influence Kanger introduces the notation Sf-eX,S) and Sf-(X,S,A) for see to it and Mojl for practical possibility. I shall nevertheless stay with his Do-operator in particular since this is what he returns to in later papers (1985 and 1986). Influence is interpreted as follows (1977 , p. 14): X has in relation to Y an influence of the type capacity with respect to SeX,Y) (PI)
Poss( ::JA) Do(X,S(X,Y),A)
Being too weak a relation, allowing everybody to have such a capacity, Kanger strengthens this notion to (P2)
(::JA)Poss Do(X ,S(X ,Y),A) by some means it is possible for X to see to it that SeX,Y)
which he finds adequate for the concept of 'influence' (1977 , p. 15).
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GHITA HOLMSTROM-HINTIKKA
10. TYPES OF INFLUENCE 10.1 Atomic Types of Influence In analogy with types of rights Kanger defines types of influence by means of non-contradictory, maximal conjunctions of sentences of the form : (~A)Poss
Do(X,S(X,Y),A)
(~A)poss
Do(Y,S(X,Y),A)
or or by sentences we arrive at by the denial of any of the components "(~A)", "Poss", "Do" or "S(X,Y)". Such sentences are named simple sentences of influence (1977, pp. 15-16). Due to the acceptance of the two principles I-II below the atomic types received at are reduced to 26. I II
not Poss Do (X,S,A) Poss not Do (X,S,A) (~A)
The first one states the trivial truth that there is always some means by means of which it is impossible to see to it that S. The second principle states that it is always possible that X abstains from seeing to it that S by means of A. X can always remain passive. All simple sentences of influence containing either form I or II should be excluded from the non-contradictory conjunctions of simple types of influence. Such sentences are either always true and thereby redundant in the conjunction or else always false and thereby excluded from the non-contradictory conjunctions . Having made this observation we shall go one step further and introduce the following notation. We shall write Can Do (X,S) for
(~A)
Poss Do (X,S,A)
thereby utilizing one of Stig 's variants (albeit not yet in Kanger, 1977). The reading of Can Do (X,S) is: X can see to it that S becomes the case. Note that Can Do (X,S) and Poss Do (X,S) are distinct (cf. HolmstromHintikka, 1997, p. 108). The four simple types ofinfluence are called Capacity (Formag a), Security (Sakerhet), Counter-capacity and Counter-security. As the explication of these types resemble those of simple types of rights there is no need for a complete list here . Suffice it to mention only one (for the complete list see Kanger, 1977)
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X has in relation to Y an influence of type capacity with respect to S(X,Y) This is interpreted in the symbolic language just introduced: Can Do (X,S(X,Y» In addition we have Not: Can Do (Y, not-S(X,Y» Can Do (X, not-SeX,Y» Not: Can Do (Y, S(X,Y» The atomic types of influence are constructed as combinations of simple types and their denials. (For further developments of 'practical possibility' initially inspired by discussions with Kanger see Holmstrorn-Hintikka, 1991, pp. 96 -123.)
10.2 Higher Order of Influence Sometimes we need a capacity to have a capacity but more interestingly we may also practice our influence. It is easy to see that if Y executes his influence of the type capacity in relation to X concerning S(X,Y) this simply means that Y sees to it that S(X,Y). Kanger accepts a set of principles (not necessarily exhaustive) govering an agent's influence: III IV V VI VII
If Do (X,S) then S If Do (X,S) then Can Do (X,S) If Can Do (X, Can Do (X,S» then Can Do (X,S) If Can Do (X,S) then Can Do (X, Can Do (Y,S»4 If Can Do (X,S) then Can Do (X, not-Can Do (Y, not-Sj)
10.3 Unavoidability As was mentioned earlier, the concept of ' unavoidability' enters Kanger's writings at an early stage (New Foundations, 1957). In the beginning Kanger saw 'unavoidability' as a modal concept and says that 'OughtA' always implies that '-A is avoidable' . 'Unavoidable' is as we noticed to be understood in the following way: only such facts are unavoidable which would be or would have been outside the range of reasonable and foreseeingly planned joint human efforts .
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GHITA HOLMSTROM-HINTIKKA
Kanger's essay named "Unavoidability" is in many respects an interesting one . For one thing, this is an attempt to develop "a non-modal explication of the notion: P is unavoidable for agent A" (Kanger, 1986, p. 227). Moreover, the concept of 'condition' is here systematically used for the previously employed 'state of affairs' and here Kanger also returns to and further develops his thoughts about 'judgement' first introduced in "Law and Logic".5 Furthermore, one of the principles accepted (principle (3», makes a major difference in the later Kanger inspired developments of Action Theory, for instance in my own work (Holmstrom-Hintikka, 1991). In addition, in "Unavoidabili ty" Kanger modifies the equivalence rule of action to become an on-a-par relation defined for three-place action predicates (cf. Holmstrom, 1985, p. 60) . Conditions may be exemplified by "Agent A turns on the electric switch" (1986, p. 227) . In what follows the letters M,P,Q,R are used as variables for conditions. Thus, the Do-predicate Do(A,P,Q) is also considered a condition. But since "all conditions are judgements", Do(A,P,Q) is also a judgement. As a reading of this predicate Kanger suggests among others: "By means of the fact that P, the agent A brings about the result Q", or as: "With P at hand, A sees to it that Q", or: "By means of P agent A causes it to be the case that Q" (cf. Holmstrom, 1985). A central concept in this study is the equivalence relation P-AQ, for for A P is on-a -par with Q defined as" Def
(P-AQ)
= «R)(Do(A,P,R)
- Do(A,Q,R))) & «M)(Do(A,M ,P) - Do(A,M,Q»)
In Kanger (1972), as we have seen, when actions were still expressed as two-place relations Kanger thought of identity in terms of the principle II
If f-(F = G), then f-Do(u,F)
= Do(u,G)
A still stricter equivalence than the on-a-par relation is a congruence relation: Def
(P "" AQ) = (R)«P - R) -A (Q - R» As far as A's activities are concerned P and Q are equal. (1986, p.229)
By means of the parity condition Kanger introduces the concepts of being 'avoided' and more importantly 'unavoidability'. As 'avoidability' the way it is introduced may feel less intuitive for somebody - including myself -let me here give a full presentation of Kanger' s thoughts:
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For most agents, many conditions are, so to speak , out of reach, or avoided, in the sense of not being involved in any of the agent' s activities as means or as results . Th us, for example, for me all false co nditions as well as true condi tions such as: Kiwis breed on Kapiti Island , are clearcut insta nces of avoi ded conditions. Obviously, the more passive an agent is, the more conditio ns would be avoided. This notion of being avoided is defined in the straightforward way: Def
Avd(A ,P) =« R) ..., Do(A,P,R) & (M) ..., DO(A,M,P»
( 1986, p. 229) Kanger' s action theory conce ntrates on an aspec t of action where intentions or purposes have no place. Had these mental aspect s or ac ts been included I belie ve that the concept of avoiding coul d have been expressed as follow s: agent A see s to it for the purp ose that P that. he does not see to it that R by mean s of M i.e., Int Do(A,-'Do(A,M,R),P) where HInt Do" is the predi cate for purp osive action. (Cf. Holrnstrom-Hintikka, 199 1. In part icular see p. 127.)7 Unav oida bility is defined simply by mean s of the equivalence Def
Unav(A,P) = (Q)(( P & Q)
- A
Q)
'T rivially true cond itions and co nditions that always are at hand for the agent are often unavoid able" Kanger says .
10.4 Assumptions and Consequences Among the assumpti ons made for the Do-predicate, in his paper (1986), Kanger mentions three : (1 ) (2) (3)
Do (A,P,Q) - (P & Q) -,Do(A,P,T) (::JQ)Do(A,T,Q)
Fro m my point of view, the cruc ial principle is the third one according to whic h it is ass umed that the age nt sees to a result by means of a tautology at hand , doing nothing with respect to the result, leaving thin gs as they are . Myself, in developin g my own theory (Holmstrom-Hintikka, 199 1) I realized that actions need to be divided into three, not only two as I had thought (see e.g. Holm strom , 1985): 1.
2.
mere causation : C(A,M,R) for agent A, M suffi ces to make sure that R instrumental action : E(A,M,R) by means of M age nt A sees to it that R
202
3.
GHITA HOLMSTROM-HINTIKKA
purposive action: A(A,R,P) agent A sees to it that R for the purpose that P.
Although Kanger's action concept resembles intrumental action the on-apar definition and principle (3) turns it into a mere causation i.e., causing in my terms. For instance when a bus comes to a quick stop and A thereby pushes B (unintentionally), this is an example of a mere causation, agent A causes it that B is pushed. Kanger's readings of his Do-predicate from "sees to it", "brings it about" to "causes" signals that his emphasis is sometimes on the mere causation side whereas seeing to it turns on the intentional aspect. By separating the three action concepts we can grasp the, as it were, more physical doing of an agent. For this kind of doing we can construct a logic where the on-a-par relation holds . We can even show that 'causing' is a lattice (Holmstrom-Hintikka, 1991). Instrumental action, where the C::3R)Do(A,T,R) is not accepted is a partial ordering and the on-a-par relation does not apply either. Had this distinction between 'mere causation' and 'instrumental action' not been made we would have had the following problems: (i) (ii)
Accepting (::JR)Do(A,T,R) is counterintuitive Refuting this principle, i.e., accepting ..,(::JR)Do(A,T,R) leads to a logical inconvenience. We can easily prove that (T -A ..L)
My solution to this problem was to make this tripartition." FURTHER INFLUENCE Higher-order influence can be applied to other agents as to their actions. But it is conceivable that an agent can influence other people's mental acts such as thoughts, intentions and wills as well (see for instance Holmstrom-Hintikka, 1997). It is also easy to understand that one agent, a person, can influence a computer to perform certain moves . Kanger did not explicitly develop his concept of 'influence' to the fields of artificial intelligence nor even to influencing other agent's purposes or wills . But Kanger did by his own philosophy influence other scholars to continue along his lines inspired by his ideas .
Boston University and University of Helsinki
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NOTES Cf. Lars Lindahl' s 'instrumental action' in Lindahl (1977). Ingmar Porn also refers to a three-place action oper ator E,(p,q) altho ugh his emphas is is on the two-pla ce relation E,p. 3 Compare Lars Lindahl ' s null actions (Lindahl, 1977 ). It is easy to find counterexa mples to principle VI. Kanger was for a lon g time work ing on various aspects of the co nce pt of 'j udgement' . In oral presentati on s and pri vate discussions I came to be familiari zed with prelimin ary outlines and thou ghts of a logi c of judgement as well as of other expli cation s thereof. Un fortunately all possible further notes on thi s subjec t seem to be lost. 6 A similar definition for congruence was used in Holmstrom (1985, p. 60 ). Althou gh modal operators are at usc here (H-H, p. I27 f.). it is conceivable that Kanger' s method could be empl oyed inter alia. 8 For further and deeper understandin g of this probl em and its sol ution sec HolmstromHintikka (199 1, pp , 29 -52).
REFERENCES Chellas, Brian F. (1969), The Logical Form of Imperatives, Perry Lane Press, Stanford. Holm strom , Ghit a ( 1985), "Wills, Purp oses and Actions" in Ghita Holm strom and Andrew J.I. Jones (eds.), Actio ll, Logic and Social Theory , Acta Philosoph ica Fennica Vo l. 38, Societas Philosoph ica Fennica, Helsinki, pp. 49 -62. Holmstrom-Hintikka, Ghita (199 1). Action, Purpose and Will. A Formal Theory, Acta Philosoph ica Fenn ica Vol. 50, Socie tas Philosophi ca Fenn ica , Helsink i. Holmstrom-H inti kka . Ghita (1997 ), "Actions in Action" in Ghita Holm strom -H intikka and Raimo Tuomela (eds.), Contemporary Action Theory, Vol. I, Kluwer Academic Publ isher s, Dordrecht , Holland/Boston , U.S.A., pp . 109-1 34. Jones, A.J.I. and M.J . Sergot (199 1), "On the Role of Deont ic Logic in the Characterization of Normati ve System s". Proc. First Internat ional Workshop on Deonti c Log ic in Computer Science (DEON '9/), Amsterdam, Decembe r 1991. Jon es, A.J.I. and M.J. Sergot ( 1992), "Deontic Logic in the Represent ation of Law: Towards a Methodology". Artificial Iruelligence and Law, Kluwer. To appea r 1992. Jones, Andrew 1.1. and Mare k Sergot (1992), "Formal Specification of Security Requirements usin g the Theory of Normative Positions" in Y. Deswarte , G. Eizcnbe rg and J.-J. Quisquater (eds .), Computer Security - Esorics 92 (Proceedings of the Second Eur opean Symposium on Research in Computer Securit y), Sp rin ger-V erl ag (Lecture Notes in Computer Science 648) , Berlin, pp. 103- 121. Kanger, Helle (198 1), Human Rights and their Realization, Dep artment of Philosophy, University of Uppsala, Uppsala. Kanger, Stig (195 7), New Founda tions fo r Ethical Theory , Stockho lm. Reprinted in R. Hilp inen (cd.) ( 197 1), Deontic Log ic: Introductory and Systemat ic Readings, D. Reidel Publi shin g Co mpany, Dordre cht , Holl and, pp. 36-58. Kanger, Stig (1963), " Rattighe tsbegreppet " (The Concept of Right) in Sju fi losofis ka studier tilliignade Anders Wedberg , Stockh olm . Repr inted and extended in St ig Kanger and Helle Kanger (196 6), "Rights and Parliamentarism," Theo ria 32, 85- 115. Kanger, Stig ( 1972 ), "Law and Logic ," Theo ria 38, 105- 132. Kanger , Stig ( 1977), "Nagra synpunkter pa begrepp et int1ytande" (Some Aspec ts on the Con cept ofi nfluence) , Filosofi ska smulor tilliignade Konrad Marc-Wogau, Philosoph ical Studies 27,
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Department of Philosophy, Uppsala University, Uppsala, pp. 12-23. In translation 2000 by Sharon Rider in G. Holrnstrorn-Hintikka, S. Lindstrom and R. Sliwinski (eds .), Collected Papers of Stig Kanger with Essays on his Life and Work, Vol. I, Kluwer Academic Publishers, Dordrecht, Holland/Boston, U.S.A. Kanger, Stig (1985) , "On Realization of Human Rights" in Ghita Holmstrom and Andrew J.1. Jones (eds.), Action, Logic and Social Theory, Acta Philosophica Fennica Vol. 38, Societas Philosophica Fennica , Helsinki , pp. 71- 78. Kanger, Stig (1986) , "Unavoidability" in M. Furberg et al. (eds.), Logic and Abstraction. Essays Dedicated to Per Lindstrom on his Fiftieth Birthday. (Acta Philosophica Gothoburgensia, No.1), Gothenburg, pp. 227 - 236. Lindahl , Lars (1977), Position and Change, D. Reidel Publishing Company , Dordrecht, Holland/Boston, U.S.A. Porn, Ingmar (1970) , The Logic of Power, Basil Blackwell, Oxford. Porn, Ingmar (1971), Elements of Social Analysis, Department of Philosophy, University of Uppsala , Uppsala . Porn , Ingmar (1977), Action Theory and Social Sciences, D. Reidel Publishing Company, Dordrecht , Holland/Boston, U.S.A.
SvEN OvE HANSSON
KANGER'S THEORY OF PREFERENCE AND CHOICE
1. INTRODUCTION
The logic of preference and choice preoccupied Stig Kanger at least from the late 1960's until just before his death in 1988. He devoted three publications to this subject: "Preferenslogik" [Preference logic], 1968. (pp. 199- 208 )1 "Choice and modality", 1976. (pp. 211 -213) "A note on preference logic" , 1980. (pp. 209 -210) In addition, he left behind an unfinished manuscript on choice functions , which I believe that he still worked on in the months before his death: "Choice based on preference". (pp. 214-230) I will attempt to assess these papers in Kanger's own spirit, which means that I will focus on whatever problems and weaknesses I believe myself to have found in them . Needless to say, in doing so I run the risk - or is it certainty? - of exposing my own lack of understanding rather than that of Stig Kanger. The papers under review are 20 years apart , and it is only to be expected that they differ in notational conventions. In what follows, I will use a notation that is close to Kanger's own, but modified to avoid the differences in notation between his different papers. 2. PREFERENCE LOGIC "Preference logic" from 1968 is a discussion of principles for the three relations "at least as good as" (z), "better than" (» , and "equal in value to" ("'), as applied to sentences representing states of affairs .2 Without further ado Kanger accepted as trivial that ~ is reflexive and transitive (a quasi-ordering) and that > and > are definable in the conventional way from ~ (P > q iff p ~ q & q i p, p '" q iff p ~ q & q ~ p).
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G. Holm strom-Hintikka, S. Linstr om and R. Slivinski (eds.), Collected Papers ofStig Kanger with Essays on his Life and Work . Vol. /I. 205-219. © 200 1 Kluwer A cademic Publishers. Printed in the Netherlands.
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2.1 Intuitive Counterexamples
He devoted a couple of pages to a critical discussion of some further conditions on preferences that had been proposed by Soren Hallden, G.H. von Wright, and Bengt Hansson. Hallden's postulate p zq iff (p & -'q)
z
(q & -yJ) ("conjunctive expansion'")
was said by Kanger to be "not entirely reasonable". It has , he said, "an unnatural consequence: every condition that has a neutral supplement is as good as a contradiction. (By a neutral supplement to a condition p is meant a condition q such that p z (p & q) and p z (p & -'q).)" (p. 199) It may be worth the trouble to write out this argument in detail:
(4)
p z (p & q) p z (P & -'q) p & -,(p & q) (P & -'q) z J.
(5)
p ZJ.
(1) (2) (3)
z
(p & q) &
-yJ
premise premise (1) , conjunctive expansion (3), intersubstitutivity (2), (4), transitivity of z
Kanger's treatment of von Wright's preference principles is strongly critical. For instance, he shows that von Wright's principle p > q iff (p & r) > (q & r) and (p & -,r) > (q & -'r)
implies that p j q for all p and q. The proof is simple: just let p > q and substitute J. for r. Then we obtain p & J. > q & J. , hence by intersubstitutivity J. > J., contrary to the irreflexivity of> (that follows from the reflexivity of ~ and the definition of> in terms of z). Kanger's substitution of J. for r does not comply with von Wright's intensions. von Wright seems to have had in mind some kind of atomic or logically independent sentences, but he did not explain this clearly. In a note, Kanger quoted von Wright as saying "Let r be some state which is different fromp and q and which is not, in its turn, a truth-function of any other states.:" Kanger rightly noted that every r is a truth -function of other states (such as r & u and r & -'u), and in another note (note 3) he declared that he chose to disregard the unclear condition imposed by von Wright on r. A more charitable option would of course have been to try to reconstruct it in a manner compatible with logical consistency. Three principles put forward by Bengt Hansson seem to have interested Kanger the most: BHl
p ~ q or q ~ p
KANGER' S THEORY OF PREFERENCE AND CHOICE
BH2 BH3
207
If p q, then p z (p f q) If p > q, then (p f q) 2 q
(Note that the combination of IVa and IVb amounts to a variant of the interpolation principle discussed above, but now for exclusive disjunction.) This paradox is subjected to a penetrating discussion by Wlodek Rabinowicz in another contribution to this volume. My own reaction to it is to reject (IVa) and (IVb) (and with them disjunctive interpolation, that I believe to be plausible for inclusive but not for exclusive disjunction). All that Kanger says about (IVa) and (IVb) is that they "seem to be evident". However, it is not difficult to construct counter-examples. Let p and q be two logically independent states of affairs such that the four composite states of affairs are ordered in terms of value as follows :
p&"'q
V
-.p & q
V
p&q
V
"'p&"'q For a simple example, suppose that my wife and I are both on our way home from work, but cannot communicate with each other before we come home. (This was in the distant past, before the advent of the mobile phone.) We need a loaf of bread, and we both pass a shop in which we can buy bread. The best outcome is that only one of us buys bread, but it is better that both do it than that neither of us does, since in the latter case we will be out of bread. On my way home I pass a bakery with excellent bread, whereas she only passes a grocery store. Therefore, it is marginally better that I buy bread (P) than that she buys bread (q) . My (and her) preferences over complete alternatives can then be as shown above. Let us evaluate this example both with ceteris paribus and weighting methodology. To begin with the first-mentioned of the two methodologies, there is only one total state, p & »q. in which p holds but not q. There is only one total state, "'p & q, in which q holds but not p . The former is better than the latter. We then clearly have p > q. Similarly, there is only one total state , -.p & q, in which P f q holds but not p. There is only one state, p & q, in which p holds but not p f q. The former is better than the latter; hence (p f q) > p, contrary to Kanger's (IVa). Next, let us use probability-weighted utility. Suppose that each of the four
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complete alternatives has the same probability, and that their values are as follows: p Sc rq -'p&q p&q -'p & -'q
12 10
6 0
Then the value of pis 9, that of q is 8, and that of p f q is 11, again contrary to Kanger's (IVa) . Would Kanger have been convinced by this example that his principles (IVa) and (IVb) are not as "evident" as he said? I am not so sure, given the way he treated his own counterexample to the related disjunctive properties BH2 and BH3 proposed by Bengt Hansson. 3. THEORY OF CHOICE Kanger developed his ideas on choice in the unfinished "Choice based on preference" and in the short note "Choice and modality", published in 1976. 3.1 Binary Choice Functions
In "Choice based on preference", Kanger introduced an unconventional type of choice functions, namely functions with a pair of sets, rather than a single set, as arguments. He did not explain why he did this. One possible explanation may be that he took seriously the dependence of preference relations on alternative sets. It is not self-evident thatx is preferred to y among {x,y} if and only if x is preferred to y among {x ,y,z} . More generally speaking, the preference relation best suited for guiding choices among a certain set of alternatives need not be a suitable guide for choosing among a particular subset of that set - not even if comparison-costs are negligable. Two types of examples of this are well-known from the literature on choice functions. First, the alternative set may carry information, as in Amartya Sen's example: "[G]iven the choice between having tea at a distant acquaintance's home (x), and not going there (y), a person who chooses to have tea (x) may nevertheless choose to go away (y) , if offered - by that acquaintance - a choice over having tea (x), going away (y), and having some cocaine (Z)."lO Hence, in formal terms, letting Ch stand for a conventional choice function, Ch( {x,y}) = {x} and Ch({x,y,z}) = Ivl" Secondly, choice may be positional. In a choice between a small apple (x), a big apple (y), and an orange (z), you may choose the big apple, but in a
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choice only between the two apples you may nevertheless opt for the smaller one. !2 In formal terms, we then again have have Ch( {x, y }) = {x} and Ch( {x, y, z l) = {y}. There does not seem to be any sensible way to base a choice function such as this on a conventional preference relation. From Ch( {x,y}) = {x} it seems to follow that x is strictly preferred to y, x > y. Similarly, from Ch( {x,y,z}) = {y} it seems to follow that y > x . This is an impossible combination under the weak assumption that strict preference is asymmetric. A rather obvious way to deal with this problem is to distinguish between different preference relations, one for each alternative set. We can then write a >y b to denote that a is preferred to b among the elements of V. In the above examples, we have x>lx,ylY but y>(x.y.z1x, which does not contradict asymmetry since >(x,yj and >(x.y.z) are distinct preference relations. But Kanger goes further than this. He replaces the indexed> by a choice function. Taking only one step at a time in the direction of his formalism, this corresponds to introducing an indexed choice function, ChV<X) with the following properties in our example:
Chlx.yj({x,yD = {x} Ch{x.y.z)({x,y}) = {y} What makes this notation more general than the ~v notation is of course that the argument (X in Chy(X)) need not have exactly two elements. I have difficulties in finding a reasonable intuitive interpretation of this type of choice functions. We can interpret x>yy as saying that x is preferred to y in a comparison among the elements of V. But what does it mean to say, for instance, that X
E
Ch{x.y.z.wj({x,y,z})?
Here, we have two alternative sets, one smaller among which the choice is made ({ x,y,z}) and one larger which provides a sort of background or general context for the choice ({x,y,z,w D. (Note that V is not the set of all potential alternatives, since Kanger also has a larger background set U which is interpreted in that way .)!' Formally, we can define ChV<X) in terms of an underlying, indexed preference relation. This can be done as follows: If, X c V, then ChV<X) = {x E X I (y E X) ""(y>~)} If, X s: V, then ChV<X) is undefined. The reason for the last clause is of course that >y is defined only for arguments that are elements of V. However, Kanger did not wish to introduce such a
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restriction. Instead, he had his choice function defined for all backgrounds (V) and all arguments (X) . In "Choice based on preference", he introduced his binary choice function C as follows: "I intend to interpret C(V,X) as the set of those alternatives of (VnX) which , compared with alternatives of V, are regarded as not being worse than any alternatives of (VnX) . In other words: x E C(V,X) iffx E (Vn X) and (y)(y>yX - y E ( V \ X» " (p. 214)
where y>yX has the interpretation "y is better than x in V". We can rewrite Kanger's definition as follows : C(V,X)
= {x EO V n X I (y EO V n X) -'(y >yx)}
We can say that C(V,X) selects those elements of vnX that are preferable" according to the standards for elements of V. Kanger's C and our Cli are interdefinable in a fairly obvious way: C(V,X) = Chy(VnX) If X c V, then Chy(X) = C(V,X). If X g;, V, then Chy(X) is undefined.
Hence , Kanger's binary choice functions are extensions of the indexed choice functions Ch to the case when the argument is not a subset of the index. To see the intuitive meaning of C, let V denote the set of all violin sonatas and X the set of all compositions by Xenakis. Then C(V,X) is the set consisting of those violin sonatas by Xenakis which are, in a comparison including all violin sonatas, not worse than any other violin sonatas by Xenakis. 3.2 The Dual Functions
However, Kanger uses neither C nor >v as primitive notions . Instead, his primitive function is a function D that is dyadic just like C, and with the interpretation: "D(V,X) is the set of those alternatives of V which, compared with alternatives of V, are regarded as not being worse than any alternative of V\X. . In formulas: x E D (V,X) iff x E V & (y)(y> yX - y E ( VnX» " (p. 214)
We can rewrite this as follows : D(V,X)
= {x EO V I(y EO V\ X)-,(y> yx)}
Using the same example as above, D(V,X) is the set of all violin sonatas that are not worse than any violin sonata by anybody else than Xenakis. As was observed by Rabinowicz and Sliwinski (1990), D is a somewhat "artificial concept" in the sense of not immediately suggesting itself, from an
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intuitive point of view, as a primitive notion in the theory of choice. It seems as if Kanger had formal rather than intuitive reasons for choosing it as a primitive. For expository convenience, I will introduce an expressively equivalent function E, such that E(V,X) = D(V,V\ X), or more explicitly:
= {x E V I (y E VnX)-'(Y>yx)} Clearly D(V,X) =D(V,vnX) =D(V, V\ (V\X)) =E(V,v\X) . The advantage of E(V,X)
E over D is that it is somewhat more intuitive. We can interpret it as follows : E(V,X) is the set of V-elements that are not >y-worse than any Xelement.
In our example, E(V,X) is the set of all violin sonatas that are not worse than any violin sonata by Xenakis. If weak preference is transitive and complete, then E(V,X) is the set of violin sonatas that are at least as good as Xenakis 's best violin sonatas. We can regard E as an extended choice function, that extends the choice in X to the whole of V. If ~ is transitive and complete, then E(V,X) is the set of V-elements that are at least as good as the best X-elements. Kanger did not name his D function. Since it is the dual of E, it can be called the dual extended choice function. Kanger himself provided a definition of C in terms of D: C( V,X)
=XnD( V,V \ X)
For E, the corresponding definition is: C( V,X)
=XnE(V,X)
Kanger did not provide a definition of D in terms of C. Under the assumption that C and D are based on the same transitive and complete weak preference relation, E and D can be defined in terms of C as follows: E( V,X) = U {C( V,Y) I X c Y} 15 D(V,X) = U{ C(V,Y) I V c XUY}16
3.3 Choic e as Modal Logic In the introductory section of "Choice Based on Preference", Kanger announced that the concluding section - which was never to be written - was intended to point out the close connections "between choice functions - the D-function, in particular - and some kinds of operators studied in certain extensions of Boolean algebras and in modal logic". A preview of what he
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intended can be found in his brief "Choice and Modality" from 1976. There he discussed a monadic operator, which is essentially the D of the longer paper but with a fixed background set V. I ? He pointed out that if D satisfies the following three axioms, then it "determines" a normal modal logic in Segerberg's sense: (I) (II) (1lI)
If X c Y, then D(X) \:: D( Y) n XEF D (X) \:: D( nXEFX) if (/) f. F \:: &:>( \1) . D(\I) = V
In what way does Kanger's D function correspond to the modal operator of necessity? Let X denote a set of alternatives. Then the corresponding sentence X can denote that the actual alternative is an element of X. We then get the following nice correspondences: X ~Y
~
x-x 1..
(a contradictory sentence)
T (a tautology) J:: X nY X&X
etc.
Now for the difficult part: How can D be interpreted? In the last sentence of "Choice and modality", Kanger says that "there is a close and direct connection between choice theory and modal logic which might be worth some further exploration". He did not, however, specify the nature of this connection. Sten Lindstrom has provided an interpretation of the D operator that seems to capture what Kanger must have had in mind." Let us consider Kripke structures of the form a binary relation on U. Subsets of U are denoted X, Y,... and its elements are denoted x, y ,... We can use x 0= Yas an alternative notation for x E Y. Next, let D be an operation from and to &:>( U), such that for all X c U and x, y E U: x E D(X) if and only if (y)(y>x - y E X)
(This coincides with the definition of D given above, provided that V is fixed and coincides with u.) Equivalently:
x
0=
D(X) if and only if (y)(y>x - y
0=
X)
Hence, D is a necessity operator in a modal logic in which> has taken the place of the accessibility relation . A tentative reading of D(X), also proposed by Lindstrom, is "If things were better, then X would be the case".
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A large part of "Choice based on preference" (Sections 3- 8) is devoted to demonstrations of what properties of D are needed to ensure that it can be based on a preference relation in the intended way, and what further conditions on D are necessary to obtain additional properties of the preference relation. These sections are conceptually fairly straight-forward. They are expressed in terms of the binary D function, but V is kept constant so that they could also have been expressed in terms of the unary D function of his 1976 paper "Choice and Modality". These results do not differ drastically from what are now standard results on the relations beween choice and preference. 3.4 Shifts in the Background Set
Still more interesting problems are discussed in Section 9 and the final unfinished Section 10 of "Choice based on preference". According to the plan announced in the introduction, these sections and an unwritten Section 11 were meant to provide "rationality principles of another kind in which the background V is no longer kept fixed" . Kanger rejected as implausible two extreme views. One of these is that choices are completely stable, or more precisely: determined by the restriction to V of a preference order among the "grand domain" U which includes all possible background sets V. The other extreme view is that there are no rulebound connections between preference orders for different background sets. His own proposal, he says, "goes midpoint between the two extremes". (p.216) His proposal is expressed in terms of preference orders determined by the binary choice function, as follows :
X>~Y iffy f£ C(V,{x,y}) He assumed that there is a set of basic preference orders that corresponds to "simple aspects" with respect to which alternatives can be compared. Furthermore, he assumed that these aspects are finite in number . Each of these aspects corresponds to a subset of U, and for each of these subsets VI"" Vm there is a preference relation >f that is obtained by applying the binary choice function C with Vk as a background set. Each >f is required to be a strict weak ordering k (but he mentioned the possibility of relaxing that condition and only requiring them to be semiorders). In my view, the (tacitly made) assumption that each aspect can be represented by a set Vk is far from unproblematic. From a formal point of view it has the obvious consequence of limiting the number of aspects to 2m where m is
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the number of alternatives. More importantly, in practical examples of preferences combining several aspects, it doe s not seem intuitively sound to require that each aspect be bound to a set of altern ative s to which no other aspect is bound. It would not have been difficult for Kanger to generalize his approach and introduce a set of basic preference relations that are unrel ated to subsets of U. He did not explain why he did not do so. The reason may have been either metaphysical or connected with his strict standards of economy in terms of formal primitives. Kanger formed the tran sitive closure of the union of all basic preference orders, T= (>~ u ...u >~ )* 1
f1I
A
A
Beside s T he also had use for its converse T. In particular, he used T\ T which is "w hat remains of T after removal of all cycles in T' or, as he also says, "the non-controversial part" of T (p. 228). Kanger ' s stability ax iom requires, for any subset W of U (not necessarily among the sets that give rise to basic preference orders) that; (T \
i , n (W x W) c
>~ ~ T
The right of the two inclu sions in this axiom only requires that >~ be a subset of T. The left-hand conditi on states that the preference relation for the alternative set W contains (the W-part of) the non-controversial part of T. As Kanger himself preferred to express it, this means that >~ is obtainable by resolving cyclical patterns in T. He regarded this as a fairly weak condition, "if there are several conflicting basic preferences, then the axiom says very little about the structure of >~" . A further condition which he wished to impose is that this resolution be based on a preference ordering of the basic preference orders. He introduced a relation ?: such that for any sets V and W, >~ ~ means that >~ is a "stronger or more important preference order" than >~ (p. 229). Interestingl y enough, he did not introduce ~ - on the binary choice functi on C. The definition is:
>~ ~ iff >~n w ~ >~ c >~uw The first inclu sion is intended to express that the preferenc e order >~nw conforms with >~ and the second that the preferenc e order >~u w conforms
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with >~ . He called this "a very natural relation of importance" (p. 216). The last thing he wrote in this paper was an axiom saying that ~ is transitive. It is not easy to guess how he intended to continue. In the introductory section of the paper he announced that "the consistency condition we have in mind reduces to the requirement that this relation be a quasi-ordering" (i.e., reflexive and transitive). 3.5 Kanger's Achievements in the Theory of Choice One of my strongest memories of my supervisor Stig Kanger is an occasion when I had constructed an operator for legal power. 19 He was not as enthusiastic as I had hoped. Instead , he complained that I had packed too much into a single formal notion . He was right, of course, and I later modified the construction in accordance with his advice . However , I must confess that when rereading his unfinished "Choice based on preference" I am close to uttering a tu quoque . This paper contains two important innovations in the theory of choice: binary choice functions and an exciting but elusive connection between choice and modality . Each of them gives rise to substantial difficulties, and they also seem to be independent of each other. Therefore it might have been more appropriate to develop each of them in isolation from the other. Or am I wrong? Perhaps he was on the track of a connection that it now remains for us to discover. Stockholm University NOTES I would like to thank the participants of the memorial symposium on Stig Kanger's Contribution to Logic and Philosophy, Uppsala, March 13-15 1998, for valuable comments on an earlier version of this paper. Special thanks are due to Sten Lindstrom and Sven Danielsson. All page references are to Volume 1of the present edition. In the Swedish text, the arguments of the preference relations are called "villkor" (conditions) . "What is expressed by a formula will be called a condition" (An Algebraic Logic Calculus , p. 71). 3 This term seems to have been introduced by Jennings (1967). For a discuss ion of this and related conditions, see Hansson 1996 and 1998. 4 This sentence appears twice, on pp. 29- 30 and 31, in von Wright's book . Kanger 's quotation has a couple of typos . 5 In Swedish, "nytta" and "skada" . 6 Kanger also associated to each condition a set of advantages and a set of disadvantages. However, these are not necessary for the present outline of his ideas. 7 He wrote Dp " Dq here, but that must be a misprint (p. 204) . 8 -c in Kanger's notation . 2
KANGER ' S THEORY O F PREFERENCE AN D CHOICE
219
See Hansson 1998 for further details on disjunctive interpo lation. Sen 1993, p. 502. See also Kirchste igcr and Puppe 1996. II I use Ch for conventio nal choice functions and follow Kanger in using C for those that he intro duced. 12 Anand 1993, p. 344. On posit ional choice, see Gardenfors 1973. 13 The best exp lanation tha t I am aware of was proposed in conversation by Sven Danielsson: x and y may be imposs ible to distinguish when you look at x, y. and z. However, when IV is availa ble, then you see that x is better than IV, where as y is not better than IV . It may then be reason able for a cho ice among [x.y.z} to depend on whether or not IV is includ ed in the background that can be used to facilitate com parisons. 14 Mor e precisely: unbeaten . 15 The pro of is left to the reader, with the hint that for the left-to -right direction it is sufficient to show that E(V,X) ~ u {C( V,Xu {z}) I z E V }. 16 D(V.X) =E(V, V\ X) = u {C(V,Y) I V\ X c Y} = u {C(V,Y) I Vc Xu Y} . 17 The background set was denoted V in "Choice Based on Preference" and A in "Choice and Modality". Vwill be used here. The monadic (dual extended choice) operator was denoted 0 in "Choice and Modalit y". D will be used here, 18 In a letter to the author, August 26, 1998. 19 Han sson 1986. 10
REFERENCES Anand , Paul (1993), "The Philosoph y of Intransitive Preference", Economic Journal 103, 337 346. Gardenfors, Peter (1973), "Positionalist Vot ing Functions", Theory and Decision 4, 1- 24. Hansson , Sven Ove (1986), "A Note on the Typo logy of Rights", in Paul Needham and Jan Odclstad, Changing Positions. Essays Dedicated to Lars Lindah l on the Occasion of His Fiftieth Birthday, Philosophical Studies no. 38, Dep artment of Ph ilosoph y, Uppsala University, Uppsala, pp. 47- 57. Hansson , Sven Ove ( 1996), "Wh at is ceteris parib us preference ?", Journal of Philosophical Logic 25,307-332. Hansson , Sven Ove (1998), Structures of Value, An Investigation of the Statics and Dynamics of Values and Norms. Lund Philoso phy Report s 1998: I. Jennings, R.E. (1967), "Preference and Choice as Logical Corre lates", Mind 76, 556-567. Kirchst eiger, Georg and Clemens Puppe ( 1996), " Intransitive Choic es Based on Tran sitive Preferen ces: The Case of Menu-Depend ent Information", Theory and Decision 41,37 - 58. Rabin owicz, Wlod ek (1999), " Preference Logic and Radical Interpr etation . Kanger Meets Davidson", this vo lume. Rabinowicz, Wlodck and Ryszard Sliwinski (1990), Some Scandi navian Contributions to Decision Theory, mimeographed, Department of Ph ilosophy, Uppsa la University. Sen , Amartya (1993), " Internal Co nsisten cy of Cho ice", Econometrica 61, 495- 521. von Wright , Georg Henrik (1963), The Logic of Pref erence, Edinburgh University Press, Edi nburg h.
WLODEK RABINOWICZ
PREFERENCE LOGIC AND RADICAL INTERPRETAnON KANGER MEETS DA VIDSON 1
The primary purpose of this paper is to trace the intellectual effects of an encounter between two very different philosophers working in two seemingly unconnected areas . As will be seen, Stig Kanger's meeting with Donald Davidson led the latter to modify his influential theory of radical interpretation and gave the former an inspiration to set up a rather striking paradox in preference logic . While the paradox can be dissolved, radical interpretation confronts some serious difficulties. A PARADOX IN PREFERENCE LOGIC Stig Kanger's paradox can be found in "A Note on Preference Logic". This characteristically short two-page note was his contribution to a Festschrift for Thorild Dahlquist, published in Uppsala in March 1980. To introduce the paradox, let us suppose that 2: is a preference relation on a set of states of affairs (propositions) that is assumed to be clo sed under Boolean operations. I.e., 2: is the type of relation that is studied in preference logic. We may read "A ?:: B" either evaluatively, as "State A is at least as good as state B", or descriptively, as "State A is at least as preferred as state B" . Now, let us consider two conditions that one might want to impose on 2: : Interpolation of Exclusive Disjunction (lED): For all states A, B, if A 2: B, then A ?:: (A.;.-B ) ?:: B. Here , A.;.-B stands for the symmetrical difference of A and B, respectively, i.e., for the Boolean analogue of exclusive disjunction (either A or B, but not both). Four Levels (4L ): There are some states A, B such that A, B, -A and -B all occupy different levels in 2: . That is, either A » B or B >- A, and similarly for all the other pairwise comparisons between the four states. -A and -B stand for the complements of A and B, respectively. Strict preference >- is immediately definable in terms of weak preference 2: : 22\
G. Holmstriim -Hintikka ; S. Lindstrom and R. Sliwinski (eds.), Collected Papers of Stig Kanger with Essays on his Life and Work. Vol. 1/. 22 1- 242. © 200 \ All Rights Reserved. Printed by Kluwer Academic Publish ers. the Netherlands.
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A >- B =df A .c B and it is not the case that B
.c A.
Similarly. we can define indifference as follows: A ::: B =df A .c Band B
.c A.
The two conditions above "seem evident", says Kanger, but they cannot be upheld in tandem:
Kanger 's impossibility result: There is no weak (= transitive & complete) ordering .c that satisfies both the Four Levels and the Interpolation of Exclusive Disjunction. The assumption of completeness for .c is very strong . In many cases, we would like to allow for gaps in the preference ordering. If states A and B are significantly different from each other, we may well insist that neither A .c B nor B .c A are the case . Can we avoid assuming completeness and still prove that Kanger's two conditions are mutually incompatible? Fortunately, the answer is: yes, we can . It is quite enough to assume that .c is transitive. ' In fact , as may be seen from the proof below, it would be enough just to assume that > is a transitive relation. While the transitivity of indifference is relatively uncontroversial when indifference is interpreted evaluatively, the transitivity requirement is more problematic given the descriptive interpretation. As is well known, if preferences of a subject are determined by pairwise comparisons, then intransitivities of indifference are to be expected, due to such psychological mechanisms as insufficient discrimination or attention shifts . Still , these phenomena might also be interpreted in a different way as showing that a subject's preference ordering should be determined holistically rather than by a series of independently conducted pairwise comparisons. Transitivity will then function as an apriori constraint on any adequate holistic determination of preference. Here, then , is the paradox in its final version:
Strength ened impossibility result: There is no transitive .c that satisfies both the Four Levels and the Interpolation of Exclusive Disjunction. The proof that follows slightly simplifies Kanger's original version. By the transitivity of .c, >- is transitive.' Consequently, (4L) implies the existence of states A, B, -A and -B that are linearly ordered by strict preference, in one of the twenty four possible ways. In Kanger's somewhat sadistic version of the proof, we are supposed to go through each of these possible cases on its own , one by one, and show that each such case is incompatible with (lED). Here , we shall be more economical.
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Proof Assume (lE D). We first show that, given (lE D), the excl usive disjunction of unequally valued states must be equal in value to one of its disjuncts: Lemma:
If A >- B, then A '" (A-:-B) or B '" (A-:-B) .
Proof of Lemma: Assume that A >- B. By (lE D), (i)
A 2: (A-:-B) 2: B.
Thus, in particular, A 2: (A-:-B). We consider two cas es: Case I : (A-:-B) 2: A. Then A '" (A-:-B), by the definition of "', and we are home. Case 2: It is not the cas e that (A-:-B) 2: A. Th en A >- (A-:-B), by the definition of >- . Thus, appl ying (lE D) once aga in, this time to A and A-:-B , (ii)
A 2: (A-:-(A-:-B)) 2: (A-:-B).
Sinc e A-:-(A-:-B ) = (An -(A-:-B)) u ((A-:-B)n -A)
=(An B) u (Bn -A) =B,
it foll ows from (ii) that B 2: (A-:-B). Since we already know from (i) that (A-:-B) 2: B, it fo llows that B '" (A-:-B), by the defin ition of "'. A nd so we are home aga in. We next show that : Lemma + the transitivity o f '" = (4L) is violated. Pro of by reductio: Suppose (4L) holds for some A and B. We then have either A >- B or B >- A. In each case, Lemma implies: (i)
A '" (A-:-B) or B '" (A-:-B) .
We also have either -A >- -B, or -B >- -A . In each case, Lemma implies: (ii) Since A-:-B (iii)
-A '" (-A -:- -B) or -B '" (-A -:- -B) .
=-A -:- -B, (ii) is logicall y equivalent to: -A '" A-:-B or -B '" A-:-B.
(i) and (iii) imply that two of the four states A, B, -A, -B are on the same level as A-:-B. But gi ven the transiti vity of "', this mean s that these two states occupy the sa me level , contrary to the hypoth esis. 0 How are we to deal with this paradox? To begin with, one might argue that the two conditions are not as ev ide nt as Kan ger sugges ts. Th at (4L) is not quite uncontrover sial will be seen below. But what is es pec ially important is that the see mingly strong intuiti ve appea l of (lED) is decepti ve. In the first place, the
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value of the exclusive disjunction may simply be incomparable with the values of the disjuncts. The evaluation of disjunctive states is notoriously contested. But even if we ignore this possibility, we might still want to reject (lED). If the disjuncts are mutually compatible with each other, the value of their exclusive distinction need not lie somewhere in-between the values of the disjuncts. After all, in the exclusive disjunction of A and B, the alternatives envisaged are not simply A and B but A-and-not-B and B-and-not-A. Thus, the value of such a disjunction should lie somewhere in-between the values of the mutually incompatible alternatives. These alternatives coincide with A and B only if A and B themselves are incompatible with each other. This suggests that (lED) is intuitive only when its weakened: Interpolation of the Exclusive Disjunction of Incompatibles (lED/): For all mutually incompatible states A and B, if A >- B, then A ~ (A-;.B) ~ B.4 Unlike (lED), (1E0I ) is fully consistent with the Four Levels, as will be seen below. Does it mean, then, that (lED) is a condition without any appeal whatsoever? I do not think so. Exclusive Disjunction Interpolation does have some independent plausibility. Even when two unequally valued states are mutually compatible, it is not easy to see how their exclusive disjunction could be preferred or dispreferred to both of them at the same time. In order to finally dissolve the paradox, therefore, we should explain how it is possible that the Four Levels and the Exclusive Disjunction Interpolation, taken separately, appear to be rather plausible (if not quite "evident"), even though , as we have seen, they cannot be upheld together. Such an explanation is not hard to come by. (4L) and (lED) are both plausible, because each of them is separately satisfied by some relatively plausible interpretations of ,::. Examples of such interpretations will be presented below. Case I: The Four Levels is satisfied while the Interpolation of Exclusive Disjunction is violated. Example: the expected utility interpretation. On this interpretation, A ~ B iffU(A) ~ D(B), where U measures the expected utility of a state. Following Jeffrey (1983), the expected utility of a state is here taken to be the weighted sum of the expected utilities of its different possible realisations, with weights being the conditional probabilities of the realisations in question. Thus, if P is the underlying probability function, we assume that the following holds for all states A and B:
PREFERENCE LOGIC AND RADICAL INTERPR ETATIO N
(EU)
225
If P(AnB ) = 0 and P(AuB ) > 0, U(AuB ) = P(NAuB )U(A) + P(B/AuB )U(B)
It is easy to see that (EU) immediately implies (lEDI): If A and B are incompatibl e, then A-;.B = AuB. Consequently, U(A-;.B ) = U(Au B) equals the weighted sum of the utilities of the disjuncts. Thu s, the utility of A-;.B must lie somewhere between the utilities of A and B. 5 (lED), on the other hand, may well be violated by this expect ed utility interpretation, as is shown by the following example. Let C, D and E be three equi-probable states that are mutually exclusive and jointly exhaustive. Thus , P(C) = P(D) = p eE) = 1/3, and P(CnD) = P(DnE) = P(CnE) = O. Let the Uvalues for C, D and E be 0, 2 and 3, respecti vely. Consider A = CuD and B = Cu E. Note that A-;.B = DuE . Using (EU) , we can calculate the utilities of A, B and As-B: U(A) = P(C/A)U(C) + P(D/A )U(D) = 1/2 x 0 + 1/2 x 2 = 1. Similarly, U(B) = 1/2 x 0 + 1/2 x 3 = 1,5, while U(A-;.B) = 1/2 x 2 + 1/2 x 3 = 2,5. T hus (lE D) is violated but the Four Levels holds; states A, B and their both complements have all different utilities: U(-A) = U(E)
= 3, U(-B) = U(D) = 2.6
Case 2: Th e Interpolation of Exclu sive Disjunction is satisfied while the 4Level Condition is violated. Examples: extremal preference (maximin or maximax), or ceteris paribus preference . Suppose that preferences between states are derived from preferenc es between possible worlds. The preference between states is defin ed as the preference between selected world-representatives of the states in que stion . To be more preci se, assume a weak preference ordering ~ on the set U of possible worlds . We identify states with sets of worlds : a state is identified with the subset of U that consists of all worlds in which that state obtains. Let c be a choice fun ction from states to world s, such that c(A) is defined iff A =/:. 0, and for each such non-empt y A, c(A) E A. Then, define A ~ B as c(A) ~ c(B). (The relation ~ does not obtain between A or B, if either of them is empty.) Supp ose that the choice function c is based on some underlying linear ordering 3> of U: c(A) picks out that world in A that comes highest in 3>. (If such a world is to exist, for any non-empt y A, whether fini te or not, it is not enough that 3> is linear; every subset of U, and not ju st the finite one s, must contain the maximal »-element. In other words, U is well-ordered by the converse of 3>.)
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Possible interpretations of»: (i) » is a "linearisation" of ~ on U (with equally good worlds coming in an arbitrary order). That is, » is any linear ordering such that for all A and B, if A comes above B in ~, then A:> B. Then ~ is maximax. (ii) » is a "linearisation" of :; on U (with equally good worlds again coming in an arbitrary order). The ~ is maximin.' (iii) :> is the ordering of worlds with respect to their similarity to the actual world (= the status quo, the reference world). For any worlds x and y, x » y iff x is more similar to the actual world than y is. Then A ~ B stands for: Ceteris paribus, it would be better that A than that B. In other words: It would be better that A rather than that B, other things being equal (to what they actually are)."
It can now be shown that if ~ is based on a preference relation ~ between world-representatives of states, selected by means of a choice function c that is based on a linear ordering » of U, then (lED) is satisfied and (4L) is violated. Proof' Clearly, since ~ is transitive on worlds, the derived ordering ~ is transitive on states. Therefore, in view of the impossibility result, it is enough to prove (lED). Suppose that A rB, i.e., c(A) r c(B). Let x be that element of {c(A), c(B)} that comes highest in the s-ordering of AuB. Clearly, x (f AnB, since otherwise we would have c(A) = c(B) and so it would not be the case that c(A) r c(B). Since x E AuB, it follows that x E A-:-B. Consequently, c(A~B) = x. But then c(A-:-B) = c(A) or c(A-:-B) = c(B). In each case, A ~ (A-:-B) ~ B.9 WHAT'S
rms GOT TO DO WITH DAVIDSON?
Here is Davidson's problem of radical interpretation: What does it take to understand another person, more or less from scratch? Davidson's goal is to elicit what a subject means by what he says, what he believes and what he prefers. The elicitation should be based on some relatively unproblematic set of empirical data. While in his earlier work, collected in Truth and Interpretation (Davidson 1986), the goal of radical interpretation was just to disentangle meaning from belief," the new project involves an additional task: determination of the subject's desires. In this way, understanding a person allows us to understand not just what he thinks but also what he does, given that what he does is a function of what he believes and desires.
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This project of a three-way elicitation - of meaning, belief and preference - has been pursued by Davidson over two decennia in a series of publications starting with his 1978 lecture "Towards A Unified Theory of Meaning and Action " (published two years later, see Davidson, 1980) and continuing with such papers as "Expressing Evaluations" (Davidson, 1982), "A New Basis for Decision Theory" (Davidson, 1985), "The Structure and Content of Truth" (Davidson 1990), and "The Folly of Trying to Define Truth" (Davidson 1996). In order to understand Davidson's project, it is instructive to compare it with Quine's well-known conception of radical translation (cf. Quine, 1960). Here is how Davidson himself describes Quine's undertaking: Noting that , while there is no direct way to observe what speakers mean , all the evidence required to implement communication must be pub licly available, Quine surveys the relevant available evidence, and asks how it could be used to elicit meanings. [...] For Quine, the key observables are acts of assent and dissent , as caused by events within the ambit of the speaker. From such acts it is possible to infer that the speaker is caused by certain kinds of events to hold a sentence true . [Added in footnote : The step from observed assents to the inferred attitude of holding true is not. I think , exp licit . in Quine.] Just here a basic challenge arises. A speaker holds a sentence true as a result of two considerations: what he takes the sentence to mean, and what he belie ves to be the case. [...] How can the roles of these two explanatory factors be distinguished and extracted from the evidence ? [...j Quine 's key idea is that the correct interpretation of an agent by anothe r cannot intelligibly admit certain kinds and degrees of difference between interpreter and interpreted with respect to belief. As a constraint on interpretation, this is often called by the name Neil Wilson gave it [Wilson (1959)], the principle of charity. (Davidson, 1990, pp. 31St)
Quine's problem is then that different hypotheses about the speaker's meaning can be defended by adjustments in the hypotheses about his beliefs. Quine's solution of this problem is that the speaker's beliefs must obey constraints imposed by the principle of charity that require s a far-reaching consensus in beliefs between us and the speaker. Given these constraints on beliefs, the available data about the speaker's assents to and dissents from sentences (including the external circumstances of such assents and dissents), we can fix the speaker's meaning (up to remaining indeterminacies). The differences between Quine and Davidson are at least sixfold: (i) While Quine pursues a project of (radical) translation, Davidson is interested in interpretation. While Quine is concerned with the conditions of successful translation from a speaker's language into the interpreter's, I emphasise that the speaker needs to know of the semantics of the speaker's language, that is, what is conveyed by the T-sentences entailed by a theory of truth [for the speaker' s language] . (Davidson, 1990, p. 3 I9).
(ii) Quine takes the circumstances that prompt assents to (or dissents from)
observation sentences to be patterns of stimulation of nerve endings rather than
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external objects or events. These proximal stimuli are taken to determine the empirical content of such sentences in the speaker's language, which implies that their translation is relatively unproblematic: they are translated into the sentences in the interpreter's language that are correlated with the similar stimulation patterns. (Relativ ely unproblematic, that is. For some second thoughts on this issue, cf. Quine, 1990, sections 15 and 16.) Davidson's view on this issue is more in line with common sense: ... interpretation depends (in the simplest and most basic situations) on the external objects and events salient to both speaker and interpreter, the very objects and events the speaker's words are then taken by the interpreter to have as subject matter. (Davidson, 1990, p. 321)
(iii) For Quine, charity is much less inevitable than it is for Davidson. While we normally assume that the speaker shares our beliefs to a large extent, this assumption of consensus is not inescapable: it might be overturned by considerations of simplicity. The linguist assumes that the native 's attitudes and ways of think ing are like his own , up to the point where there is contrary evidence . He accord ingly imposes his own ontology and linguistic pattern s on the native wherever compatible with the native's speech and other behavior, unless a contrary course offers striking simplifications. (Quine, 1990, pp. 48f., my italics.)
(iv) Furthermore, Quine 's version of charity requires us to assign to the speaker not so much the beliefs we actually hold but rather the beliefs we imagine we would have held in the speaker's shoes. [The translator] will favor translations that ascribe beliefs to the native that stand to reason or are consonant with the native ' s observed form of life. [...] Practical psychology is what sustain s our radical translator all along the way, the method of his psychology is empathy : he imagine s himself in the native 's situation as best he can . (Quine, 1990, p. 46.)
Davidson appears to be less prepared to make such allowances for expected divergences and, when he does make them, he takes empathy to uncover divergences in needs and valuations rather than divergences in beliefs. The interpreter is counselled to interpret agents he would understand as having, in important respects, beliefs that are mostly true and needs and values the interpreter shares or imagines himself sharing ifhe had the history of the agent and were in compatible circumstances. (Davidson, 1985, p. 93)
(v) While Quine's project is strictly behaviourist - the basic data concern an outward assent and dissent behaviour of the speaker - Davidson is fully prepared to allow as empirical data the speaker's mental attitudes to sentences, such as holding a sentence to be true. To be sure, such a mental attitude is manifested in an assent behaviour, but the attitude and the behaviour are not the same thing.
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(vi) However, Davidson thinks that knowing which sentences are assented to or held true by a subject under which external circumstances would be insufficient as the data basis for elicitation. To fix the meaning, and especially to fix the meaning of theoretical sentences, we need to determine evidentiary relations between the different sentences in the speaker's language: what he counts as evidence for what, what sorts of evidence would make him consider a given sentence as more probable . We need probability assignments rather than simple yes-or-no attitudes of holding true. As Davidson illustrates this point: ... a sentence [tentative ly] interpreted as meaning that there is a patter on the roof, if held true (given a high probability), ought to increase the probability of the senten ce [tentatively] interpreted as meaning that it is raining. In this way, by marking what the speaker takes as evidence for the truth of a sentence, it is possible to interpret sentences and words of an increasingly abstract and theoretic al nature . (Davidson , 1982, p. 15)
But how are we to access the subject's probabilities? Here it is time to introduce another important source of inspiration for Davidson: Frank Ramsey's program for decision theory . The task Ramsey put himself was to simultaneously determine a subject's probability assignments (quantitative degrees of belief) and his quantitative degrees of preference for different outcomes . (Cf. his paper "Truth and Probability", posthumously published in Ramsey, 1931.) The data for this elicitation were to be the subject's ordinal preferences over various gambles, as revealed by his (actual and hypothetical) choices . Being prepared to gamble on an event shows something about an agent's probability for the event in question and about his valuation of the possible outcomes. As Quine , Ramsey encountered the problem of compensatory adjustments: changes in the hypotheses about the subject's probabilities could be compensated for by adjustments in the hypotheses about his degrees of preference for various outcomes . He solved that problem by imposing a number of constraints on the subject's preferences over gambles (including such constraints as transit ivity, completeness, etc.). Given the constraints, the preferences could be seen as going by the expected utility of gambles and the constraints made it possible to uniquely determine the probability assignments that underlied these expected utilities . When event probabilities were determined, it was then easy to determine the degrees of preference for outcomes (up to the positive linear transformations). Davidson accepts Ramsey's idea of taking ordinal preferences as basic data, but rejects using preferences over gambl es as base. As he points out, when the subject is given a choice between gambles, each gamble is presented to a subject as a proposition of the form:
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A ifC, B if not C. Thus, preference over gambles is an intensional attitude - such preferences are attitudes towards propositional objects . As such, they are unfit to function as empirical data for radical interpretation. The same objection immediately applies to Ethan Bolker 's and Richard Jeffrey's approach to expected utility (cf. Jeffrey, 1983): their base for the elicitation of probabilities and degrees of preference are a subject's ordinal preferences over propositions: that A is more desirable than that B. Again, such a base is unfit to function as an empirical point of departure for radical interpretation. But from Davidson's point of view, Bolker-Jeffrey constraints on preferences over propositions have one important advantage as compared with Ramsey's: they are formulated in such a way as to allow the objects of preference to be any set of entities whatsoever, as long as the Boolean operations are definable on that set. In view of the close connection between Boolean operations and truth-logical sentential connectives, it thus becomes possible to replace propositions as objects of preference with linguistic entities. This leads to Davidson's own proposal. Provided we can identify the truthfunctional (Boolean) connectives in a subject's language, why not replace Bolker-Jeffrey preferences over propositions with preferences over (otherwise) uninterpreted sentences as basic data for radical interpretation? The subject prefers the truth of p to the truth of q (in symbols, p
~
q).
This is a mental attitude towards linguistic objects . As such, it still is an intentional attitude , but no longer an intensional one. The objects of the attitude are not propositions, but sentences that obey well-defined identity conditions. As Davidson puts it: ... the objective was not to avoid intentional states; it was to avoid individuative intentional states, intensional states, states with (as one says) a propositional object. A preference for the truth of one sentence over another is an extensional relation that relates an agent and two sentences (and a time). Because it can be detected without knowing what the sentences mean, a theory of interpretation based on it can hope to make the crucial step from the nonpropositional to the propositional. (Davidson 1990, p. 323)
Constraints on the preferences among sentences are the same as Bolker-Jeffrey conditions on preferences among propositions, with one extra constraint added :
PREFERENCE LOGIC AND RADICAL INTERPRETATION
If P
H
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q is a truth-functional tautology, then p '" q.
For the subject, his sentences are meaningful. But their meaning is originally not given to the interpreter. To replicate Bolker- Jeffrey project of elicitation, (i) we first need to identify the truth-functional connectives in the subject's language. Otherwise, simple sentences may be treated as black boxes. Then, using Bolker- Jeffrey methods, (ii) we elicit the subject's degrees of preference and probabilities for sentences. Unlike in Ramsey 's case and in the case of other standard expected utility theories, utilities in Bolker- Jeffrey approach are elicitable only up to so-called fractional linear transformations (with four free parameters instead of the usual two), and the probability assignment is only determined within certain limits II . But this remaining indeterminacy is a cost that Davidson is quite willing to pay. In the last step, given the subject's probabilities for uninterpreted sentences (plus our knowledge of the external circumstances), and making use of the Principle of Charity, (iii) we determine the subject's intension al attitudes : his degrees of (intensional) belief and the meaning of the sentences in his language. With the meaning in place, the subject's degrees of preference for sentences allow us to determine the third factor in the subject's mental life, his degrees of intensional preference . Which completes the task ofradical interpretation. But how are we to achieve task (i)? How can we identify truth-functional connectives, in an otherwise uninterpreted language, just on the basis of its user's preferences over sentences? This presupposes, of course, that we have already managed to identify the sentences of the language in question, and that we have found some way to test, for each pair of such sentences, whether the subject prefers one sentence to the other , or vice versa, or is indifferent between them. Davidson does not discuss how this can be done. Nor does he discuss the obvious objection that Bolker- Jeffrey constraints on preferences may be much too exacting for any subject to be able to obey them in full. But let us suppose that we can ignore these problems. What then? How are the truth-functional connectives to be identified? The first try was made by Davidson in the summer of 1978, at the Wittgenstein seminar in Kirchberg. In the published version of this lecture (Davidson, 1980), he suggests that we first should find the connective? that stands for neither ... nor in the subject's language. We can do it, he claims , by examining
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the subject's preferences for sentences. Since , as is well known, all the other truth-functional connectives are definable in terms of that one, the rest is easy. For example: A connective n stands for negation iff for all sentences p, np '" p?p.12 And then, A connective c stands for conjunction, iff for all sentences p and q, pcq '" np?nq. And so on. But how can we determine that? is what we have been looking for? Well, Davidson suggests the following test: ? stands for neither... nor iff: For all sentences p and q, p >- q iff q?q >- p?p. Note that, if the hypothesised interpretation of? is correct, q?q and p?p stand for ""q and ""p, respectively. Thus , what Davidson relies on here is the preference principle according to which p is preferred to q iff r-q is preferred to ""p. As it stands , this proposal is unsatisfactory, for at least two reasons, one of which is partly recognised by Davidson himself: (1) The principle p >- q iff oq >- ""p does not generally hold for the intended expected utility interpretation of the preference relation. On this interpretation, the equivalence only holds for probabilistically independent p and q. This means, that "we must devise a way of telling, from preferences among sentences , that two sentences are independent" (ibid., p. 11). While Davidson thinks it likely that such a test for probabilistic independence can be developed, he does not provide it in the paper . In fact, it can be shown that the needed test may be impossible to obtain. As we have seen, in Bolker-Jeffrey theory, the subject's probability assignments are not uniquely determinable. In particular, as Levi (forthcoming) has proved, if p and q are probabilistically independent on one of the probability assignments that are compatible with the evidence, then there will be infinitely many other such admissible assignments on which p and q are not independent. This means that the test of probabilistic independence is unavailable on the BolkerJeffrey approach! Levi (ibid.) suggests that such a test could still be available to Davidson, who takes the interpreter to rely on more information than the mere preference data about the subject. The interpreter can access his own beliefs and values and thus might be able to reduce the indeterminacies in his interpretation by invoking the Principle of Charity. I am not convinced, however, that this solution can be of help at the present early stage of interpretation. Charity
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comes into play at stage (iii), when the interpreter tries to determine the subject's intensional attitudes and in this process is supposed to maximise the consensus between himself and the subject. At present, we are still at the very beginning of the interpretation process, when the interpreter has not yet managed to fully determine the subject's extensional attitudes (= attitudes to sentences). He still has to find out the subject's degrees of preference and probability for uninterpreted sentences. At this preliminary stage, there is no room for charity. (2) Still, I may be too pessimistic." But even if a test of probabilistic independence could be developed, Davidson would not yet be in the clear. There are other truth-functional connectives that? might stand for and p?p will still correspond to negation. An example is the Sheffer stroke (= not both). So even if we found '! such that, for all probabilistically independent p and q, p >- q iff q?q >- p?p , we would still be unable to tell whether? stands for neither-nor or for not both. Davidson made a second try, which he never published, in his lecture in Oslo , in the fall of 1979. This time, instead of neither-nor, he proposed to start with a search for exclusive disjunction in the subject's language. In fact, the latter looks like a right connective to start with as far as preference data are concerned. Note that Ramsey's gambles may be understood as such disjunctions: If it is read truth-functionally, a gamble description "A if C, B if not C" is equivalent to the exclusive disjunction "Either (C and A) or (not-C and B)" . Admittedly, this truth-functional reading of "if' in the gamble description is quite unsatisfactory: it ignores the subjunctive connection that is supposed to obtain between the gamble event (C) and the prizes (A and B). What is even more important, unlike neither-nor, exclusive disjunction does not suffice for the definition of all the remaining truth -functional connectives. However, if the exclusive disjunction could be identified in the subject's language, we would at least make some progress in the process of interpretation. Davidson took it for granted that exclusive disjunction satisfies the interpolation principle (IED), possibly because he did not clearly distinguish it from the (relatively) innocuous condition (IEDI) .' 4 Therefore, he suggested that connective? stands for either ... or iff it satisfies the interpolation con dition: For all p and q, if p >- q, then p .:: (p?q) .:: q.
It is here that Kanger comes in: In Oslo 1979, Kanger showed Davidson that, on the intended expected utility interpretation of .::' (IED) does not generally hold. 15 Kanger's paradox from 1980 is, as far as I can see, an indirect result of this exchange, even though Davidson's name is never mentioned in that paper.
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As Davidson conjectures (personal communication), this polite silence might have been partly motivated by Kanger's feeling that, whatever might be said against it, (lED) is still an internally plausible principle, worth considering in its own right. Kanger had also been helpful in connection with Davidson's last and final try to solve the connective problem." This time, Davidson proposed to start with the Sheffer stroke. He presented this idea in his Hagerstrom lectures in Uppsala, with Kanger as a host, in the Spring of 1980, and he kept to it in all his later work on the subject (cf. Davidson 1982, 1985, 1990 and 1996). Thus, the idea is to first identify ? that stands for not both and then to identify all the remaining truth-functional connectives in terms of? The latter task is easy since all such connectives are definable by means of the Sheffer stroke . (The identification method to be used is thus the same as the one sketched above in connection with neither -nor.i But what about the Sheffer stroke itself? The expected utility interpretation implies that, for all p, (a)
if p >- T, then T .:: ""p,
where T is an arbitrary tautology. We also have, (b)
if T >- p, then ""p .:: T.
We note first that if ? stands for the Sheffer stroke, then p?p stands for ""p, while q?(q?q) stands for a tautology: ""q V ...,-.q. Consequently, Davidson asserts, ? stands for the Sheffer stroke iff, (i)
for all p and q, (u) if p >- q?(q?q), then q?(q?q) .:: p?p, (P) if q?(q?q) >- p, then p?p .:: q?(q?q);
and (ii)
for some p and q, it is not the case that p?p
z
q?q.
According to Davidson, no truth-functional connective apart from the Sheffer stroke satisfies both (i) and (ii). (I have somewhat simplified Davidson's condition (i). Instead of q?(q?q), he makes use of a more complicated expression in which he substitutes q?r for q in q?(q?q). This is unnecessary, since the simpler q?(q?q) already stands for a tautology if? is the Sheffer stroke.) , Condition (ii) is first added in Davidson (1990), probably in order to avoid the obvious objection that (i) by itself would be insufficient to pick out the Sheffer stroke. It is easy to check that (i) is satisfied even if? stands for the material implication. It is also satisfied if ? stands for the "tautological "
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connective that for any two sentences yields truth as value . In both cases, (i) translates into the trivially valid: (u) ifp )- T, then T ::; T, and (P) if T" > p, then T ::; T. In fact, pace Davidson, conditions (i) and (ii) are still insufficient to pick out the Sheffer stroke. Given just (i) and (ii), ? might stand for the "contradietary" connective that for any two senten ces yields falsity as value . Since on the intended interpretation, the expected utility of contradiction is undefined, the contradictory sentences do not belong to the field of ::; . Consequently, if? were such a connective, (i) and (ii) would be vacuously satisfied. As a matter of fact, given just (i) and (ii), ? might also stand for neither... nor. Since on this interpretation q?(q?q) is again contradictory, (i) would be vacuously satisfied and (ii) would be true. To exclude these remaining interpreti ve possibilities, we should add an extra condition, such as: (iii)
for some p and q, p ::; q?(q?q).
But are we now in the clear? Not quite. Some objections, not mentioned by Davidson, still remain: Objection 1: What if ? is not a truth-functional connective at all? For example: What if it stands for it is impossible that both ? Or it is improbable that both ? The Sheffer stroke is the only truth-functional connective that satisfies conditions (l) -(iii) . This much can be shown. But the subject's language may contain several non-truth-functional connectives that also satisfy these conditions. This possibility has not been excluded by Davidson; it is a potentiality he never even considers! The non-truth-functional interpretation could be excluded if Davidson's interpreter had access to some additional information about the subject's sentential attitudes , apart from the evidence about the subject's preference ordering on sentences. Suppose the interpreter also knows which sentences are held to be true and which are held to be false by the subject. (While it is a requirement of rationality that the two sets of sentences be disjoint, they will normally not be jointly exhaustive.) Then the task of identifying the truthfunctional connectives is easy. Thus, ? stands for the Sheffer stroke iff: (u) (P) (y)
Whenever the subject holds p or q to be false, he holds p?q to be true; Whenever the subject holds p?q to be true, he does not hold both p and q to be true; The subject holds p?q to be false iff he holds both p and q to be true. I?
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But, as we have seen, Davidson wants to make do without the information about which sentences are held to be true/false by the subject. In this respect, Davidson's approach to radical interpretation has changed in recent years, as compared with his earlier work collected in Truth and Interpretation. The reasons for this austerity are not quite clear: After all, the attitudes of holding true/false, if directed to sentences, are just as extensional as the attitudes of preferring one sentence being true rather than another. Possibly, Davidson's motivation was aesthetic: it is clearly more elegant to use only one kind of data (preference data) instead of two. But just as possibly, under Jeffrey's influence, he might have come to suspect that the simple yes-or-no attitudes of holding true/false are not easily ascribable to a person. In particular, their relationship to a person's probability assignments is notoriously unclear. As is well known, holding true cannot be identified with assigning high probability: the former, unlike the latter, is supposed to be closed under conjunction.
Objection 2. What is there to guarantee that the preference data reflect the subject's expected utility comparisons? As we have seen in the first section, there are other plausible interpretations of >. To be sure, if the interpreter knew that the subject's preferences satisfied Bolker- Jeffrey constraints, then he would know that they can be interpreted as in expected utility terms. But in order to know that they satisfy the constraints, he must first identify the truth -functional connectives in terms of which these constraints are formulated . At the same time, the interpreter's procedure for the identification of the connectives assumes that the subject'S preferences do obey the relevant constraints, which the interpreter cannot yet know at that stage. I do not think that the two objections mentioned above are unanswerable. Given Davidson's general holistic approach to theorising, they might both be met by a standard recipe: Why not try it out and see how it works? Thus, suppose we find a connective? in the subject's language that obeys conditions (i)-(iii). We can then start the process of interpretation with the hypothesis that? does indeed stand for the Sheffer stroke. If given this hypothesis, the subject's preferences over sentences do tum out to satisfy the Balker-Jeffrey constraints, then we may conclude that? was the Sheffer stroke and that the preference data in fact reflected the subject's expected utility comparisons. On the other hand, if the hypothesis turns out to be unworkable, we might try to look for some other candidate for the Sheffer stroke, and eventually, if all such attempts would fail, for some wholly different set of preference data. So our two objections can be met. But it is somewhat surprising that Davidson never even considers them in his essays.
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A more serious problem arises in connection with the second stage of interpretation - the stage at which the interpreter, after having identified the truth-functional connectives, moves on to the task of elicitation of the subject's degrees of preference and probabilities for sentences. At this stage, the interpreter is supposed to make use of the Jeffrey - Bolker methods of elicitation, as described in Jeffrey (1983). But are these methods applicable for Davidson's purposes? Unlike Davidson, Bolker and Jeffrey start from a preference ordering on a Boolean algebra of propositions. Davidson seems to think that sentences would do just as well, provided the language contains truth-functional connectives. To be sure, truth-functional connectives are not quite Boolean operations, but there is a close correspondence between the two. For each sentence p, we can determine its equivalence class [p] consisting of all the sentences that are truth-functionally equivalent to p. Then , in terms of the truth-functional connectives, it is easy to define the Boolean operations on such equivalence classes . For example, if A = [p] and B = [q] are such equivalence classes, then the complement of A = ["p] and the intersection of A and B = [pAq]. We get in this way the so-called Lindenbaum algebra, which is an example of a Boolean algebra. However, we are not home yet. Bolker-Jeffrey representation theorem, on which Davidson relies , rests on a very strong presupposition. It presupposes that the Boolean algebra on which the preference order ing is defined is both atomless and complete. 18 To explain these notions, let us first define the notion of implication: we shall say that a state A implies a state B iff A = AnB. An algebra is atomless, if for any non-zero state A (i.e., A -J 0 =An-A), A contains a non-zero state B such that B implies A but is not implied by it (we say that such a state is "strictly smaller" than A). If states of the algebra are propositions, then the algebra is atomless if for every consistent proposition there is a stronger consistent proposition. If X is a set of states, a lower (upper) bound of X is any state that implies (is implied by) every member of X. The infimum inf(X) of X is the greatest lower bound of X, i.e., every other lower bound of X is strictly smaller than inf(X). The supremum sup(X) of X is the least upper bound of X, i.e., it is strictly smaller than every other upper bound of X. An algebra is complete if for any set X of states, whether finite or not, it contains the infimum and the supremum of X. As a matter of fact, if a Boolean algebra contains the infima for all its subsets, it will of necessity contain the suprema as well. It can be shown that sup(X)
= -inf({-A: A E X }).
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Consequently, if the states of a Boolean algebra are propositions, then the algebra is complete if for every infinite set of propositions, it contains the infimum, i.e., the proposition that corresponds to the conjunction of the propositions in that set. Now, what about the Lindenbaum algebra? Does it satisfy the two requirements ofBolker- Jeffrey representation theorem? Roughly, this would mean (i) that for any (truth-functionally) consistent sentence p, the language contains another consistent sentence that is stronger than p (atomlessness), and (ii) that for any set of sentences, whether finite or not, the language contains a sentence that is exactly as strong as the conjunction of the sentences in the set (completeness). It is easy to see that these two requirements pull in opposite directions. The number of sentences in any language is countable. The same applies, therefore, to the number of equivalence classes in the corresponding Lindenbaum algebra. If that number is finite , the language will be complete but it obviously will not be atomless. And if the number of such classes is denumerable (= countably infinite), the algebra will be atomless but it will not be complete. In general, no countable Boolean algebra can be both atomless and complete. For a sketch of the proof, due to Sten Lindstrom, see Appendix. Thus, the Bolker- Jeffrey theorem presupposes a non-denumerable algebra of propositions. The number of propositions needed for the representation theorem exceeds by far the sentential resources of any language that we might encounter. This means that Davidson's project of elicitation, with its strong dependence on Bolker-Jeffrey elicitation methods , is doomed from the start . A move from propositions to sentences is necessary if the elicitation is to build on extensional data. But it is precisely this move that makes the BolkerJeffrey elicitation impossible! You cannot both have your cake, and eat it. APPENDIX Theorem: No countable Boolean algebra is both atomless and complete. Proof' Since all countable atomless Boolean algebras are isomorphic (cf. Bell and Slomson, 1969, Corollary 7.7 in ch. 1, p. 30), and since Lindenbaum algebras are Boolean and countable, it is enough to prove that an infinite Lindenbaum algebra is atomless and incomplete. Then it will follow, by isomorphy, that every countable atomless Boolean algebra is incomplete. We first prove that any infinite Lindenbaum algebra LA is atomless. If LA is infinite, the underlying language L must contain infinitely many atomic sentences (= sentences that are not built up from other sentences in L by means of truth -functional connectives). Therefore, for every equivalence class A that belongs to LA, where A = [p] for some consistent sentence p of L. we can
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always find an atomic sentence q that does not appe ar in p. Since p/\q is consistent (as far as truth-functional sentential logic is concerned) and stronger than p, [p/\q] is a non-zero element of LA that is strictly smaller than [pl. Consequ entl y, [p] is not an atom of LA. Given that LA is atomless, it must be incomplete. For let X be any smallest set of states in LA such that for each atomic sentence p either [p] or [,p], but not both , belongs to X. Suppose for reducti o that LA is compl ete. Then LA contain s inf(X). Thi s, however, is impossible, since the infimum of X, if it existed, would have to be an atom of the algebra . To see this, let q be any sentence such that [q] = inf(X). By the definition of X, q must be (truthfunctionally) consistent; and since for every atomic sentence p, q implies either p or -ip, q cannot be extended to a stronger con sistent sentence.
Lund University NOTES This paper is a revised vers ion of Rab inowicz (1998 ). I wish to than k several peop le who have hel ped me with comments. references and sugge stio ns: John Broome, Thori ld Dahlq uist, Sven Danielsson, So ren Hallden, Paul Needham. Jan Odel stad , Rysiek Sliwinski. Howard Sobel. Fredrik Stjernberg, Fredrick Stoutland . Goran Sundholm, and Folke Tersman. I am espec ially gratefu l to Donald Davidson. who has kin dly supplied historical inform ation. and to Sten Lindstrom. who has pro ved a theorem I needed for my argument . apart from being supportive in many other ways. 2 Kanger had to impose completeness because of his choice of primitive: instea d of .>::, he took ~ to be his only primitive and then he simp ly defined j- as the complem ent of : . Which show s. by the way, that j, sho uld not be define d in this way if we want to uphold a distinction between indiffere nce and incomparability. 3 Proof: Suppose . for reductio , that (i) A ~ B. (ii) B ~ C. but (iii) not A ~ C. By the definiti on of ~ and by the transitivity of >, (i) and (ii) imply (iv) A .>: c. Again by the definition of >, (iii) and (iv) impl y (v) C .>: A. Sinc e j, is tran sitive. (v) and (i) imply (vi) C .>: B. which contradic ts (ii). .j Since A and B are inco mpatib le. we could j ust as well replace the excl usive disjunction A.,.B with the inclusive one: Au B. A word of warni ng: Tha t (lE DI) is an intuitive condition does not mean that it is unassailable . A counte r-exampl e is provided in the next footno te. S In fact. a slight strengthe ning of (lE DI) is an axiom in the Bolker-Jeffrey theory of expected utility: (Averag ing)
For all mutu ally inco mpatible states A and B. (i) if A ~ B, then A ~ (Au B) ~ B; and (ii) if A " B. then A " (Au B) " B.
Since Au B =A.,.B. averaging implies that an excl usive disjunctio n is to be strictly interpolated between unequ ally valued disj uncts. if these are mutually inco mpatible . The role of the averaging axiom in Bolker- Jeffrey theory is somewhat simi lar to the function of the axiom of independence in other axiomati sations of expected utility. Even though independence is a much stronger assumption than averaging. the two axio ms express esse ntial ly the same idea . Consequ entl y. the well-know n Allais- type and Ellsbe rg-type objections to
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independence can be re-formulated as objections to averaging and to (lEDI). Thus, (lEOI) is not quite as innocent as it might seem to be! Here is an Allais-type counter-example: Suppose that, being are risk-aversive, you prefer receiving one million dollars to a high chance of five million dollars, even though the chan ce is as high as .9. Let A be the state in which the former but not the latter occurs, while B the state in which the latter occurs but not the former. A and B are thus incompatible and A >- B. Suppose you are offered the pro spect of either-A-or-B, with equal probability for both disjuncts. This state , A.;-B, may be seen as a prospect of getting one million with the probability of .5, five millions with the probability of .45 , and of getting nothing with the remaining probability of .05. It may well happen that you prefer B to A.;-B (if there is some risk of getting nothing, you may be prepared to take an additional risk in order to win a larger rrize), even though you prefer A to B. Which violates (1E0I). In this case , not only the exclusive but also the inclusive disjunction of A and B has a higher expected utility than A and B: V(AuB) = U(C uDuE) = 5/3. But unlike (lED), the Interpolation of (Inclusive) Disjunction : (10 )
For all states A, B, if A >- B, then A
~
(AuB )
~
B,
is a principle that is consistent with (4L) . To see that, con sider the expected utility model just as the one we have described, in which the three equi-probable, mutually exclusive and jointly exhaustive states C, 0 , E are assigned V-values 1/5,2/5,2/5, respectively. (4L) is still satisfied and if C, 0 and E are assumed to be the atoms of this state algebra, it can be checked that the model satisfies (10). 7 Maximin and maximax are two examples of what might be called "extremal preferences". Such preferences are discussed at length in Sven Ove Hansson (1998 ), Ch . 7. 8 For another interpretation of "ceteris paribus preference" cf. Sven Ove Hansson (1998 ), Ch. 6. Following von Wright (1963 ), Hansson interprets such a preference in a very demanding way: A is ceteris paribus preferred to B iff for any possible realisations of these states, the Arealisation is preferred to the B-realisation, provided that other things are equal between them. More precisely, A is ceteris paribus better than B iff every complete alternative x (= Hansson's analogue of a possible world) that instant iates A rather than B is preferable to a complete alternative y that instantiates B rather than A but otherwise is similar to x as much as possible. While I take ceteris paribus preference to be interpretable in terms of the dyadic relation of comparative similarity of alternatives (worlds) to an assumed status quo , Hansson interprets it in terms of degrees of similarity that obtains between pairs of alternatives: we are supposed to look for a pair of alternatives that are as similar to each other as possible. Thus , the underlying comparative similarity relation is four-place rather than two-place: x is more similar to y than x' to y' . It is easy to show that the preference principles validated by the two interpretations differ from each other (cf. ibid ., p.83f). (lED) is a case in point: it is valid on my interpretation but invalid on Hansson's. Both interpretations of ceteris paribus preference are, I think, legitimate, but the proposal I favor is considerably less demanding and therefore more common in everyday use . 9 Note that we also have it that c(AuB) = x. Thus , the present interpretation validates both (lED) and (10). 10 For an excellent overview of this early work , see Stoutland (forthcoming). 11 Th ese limits are del ineated as follow s (cf Jeffrey, 1983, sections 6.1 and 6.6 .): For any probability-utility pair (P, V ) that pro vides an expected utility representation for a preference ordering ~ on the algebra of propositions (with the logically false proposition removed), (P' , V ' ) is also an expected utility representation of ~ iff for some parameters a, b, c, d such that (i) ad - bc > 0, (ii) cV + d is positive for all the arguments of V, and
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ifT is the logically true proposition, cU(T) + d = L (iii) U' is a fractio nal linear transformation of U with respect to the parameters in question, i.e., U' = (aU + b)/(cU +d), while P' = P(cU + d). 12 For simplicity, I am here ignoring the distinction between use and mention. I hope thi s sjstematic ambigui ty will not co nfuse the reader. 1 Even though chari ty consi dera tions directly apply only at the third stage of the interpretation process, they might, when applicable, make us re-consider the interpretive hypotheses we have started with. Thus, if applying charity at the third stage to the mater ial obtained at the earlier stages turn s out to be dif ficult , the interpreter might at that stage co me to suspect that he has made some mistakes at the outse t of the process. Thu s, he might decide to go back to the first stage again and try out a new interpreta tion of the sentential connec tives . In this sense, it could be argued, charity is relevant to all the intepretive stages. But whether such a back-and -forth process of charity-driven interpre tation would allow us to iden tify all pairs of probabilistically independen t sentence s is by no means clear. 14 For this conject ure, I am indebted to Howard Sobe l. Sobe l has also reminded me that Ramsey' s gambles cannot be described by means of truth-functio nal statements. 15 Davidson, ( 1985), fn. 5, and (199 0), fn. 68: "I am indebted to Stig Kanger for showi ng me why an earlier attempt at a solution to this problem [= identi ficatio n of the co nnectives] would not work." The details of their encount er have been confirmed by Davidson, in personal communication . 16 "[Kanger] also added some needed refi nements to the present proposal." (Davidson, 1985, fn. 5, and 1990, fn. 68.) 17 Strictly speaking, since it is a ration ality constraint that a sentence is neve r held to be both true and false at the same time, condition ( ~) is redunda nt given (y). 18 See Axiom 2 in Jeffrey (1983 ), Ch. 9. The preference orderi ng is defined on such an algebra with its zero element removed. As Jeffrey points ou t, the assumptio ns of atom lessness and comp leteness are used in the proo f of the existence part of the representation theorem. They are not needed for the uniqu eness part. For an excellent short presentation of the theorem, cf. Broome ( 1990). That the requ irements of com pleteness and atomles sness might pose a problem for Davidson is suggeste d in Rawling (forthcoming).
REFERENCES Bell, J.L., and A.B. Siomson, 1969, Models and Ultraproducts: An Introduction, North Holland Publ. Co mp., Amsterd am - Lond on. Broome. John . 1990. "Bolker-Jeffrey Expected Utility Theory and Axio matic Utilitarianism", Review of Economic Studies 57, pp. 477 - 502. Davidson, Donald, 1980, "Towards A Unified Theory of Meaning and Actio n", Grazer Philosoph ische Studi en 11, pp. 1- 12. Davidson , Donald, 1982, "Exp ressing Evaluations", Lindley Lectures, Lawrence, Kansas, University of Kansas. Davidson, Donald, 1985, "A New Basis for Decision Theory", Theory and Decision 18, pp . 87 98. Davidson, Donald, 1986, Truth and Interpretation, ed . by E. Lel' ore, Blackwell , New York . David son, Donald, 1990. "The Structure and Cont ent of Truth ", Dewey Lectures, The Journal of Philosophy 87, pp. 279 - 328.
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Davidson, Donald , 1996, "The Folly of Trying to Define Truth", The Journal of Philosophy 93, pp. 263- 278. Hansson , Sven Ove, 1998, Structures of Value. An Investigation ofthe Statics and Dynami c of Values and Norms, Lund Philosoph y Reports, Department of Philosophy, Lund University. Jeffrey, Richard C. 1983, The Logic of Decision, University of Chicago Press, Chicago and London, second revised edition; first edition 1965. Kanger, Stig, 1980, "A Note on Preference Logic", ThD 60 - Philosophical Essays ded icated to Thorild Dahlquist on his sixtieth birthday, Philosoph ical Stud ies publ. by Philosophical Society and Department of Philosophy, University of Uppsala, vol. 32, Uppsala, pp. 37 - 38. Levi, Isaac, forthcoming , "Representing Preferences", to be publi shed in the Schilpp volume on Davidson. Quine , Willard Van, 1960, Word and Object, MIT, Cambridge , Mass. Quine, Willard Van, 1990, Pursuit of Truth, Harvard University Press, Cambridge , Mass., and London . Rabinowicz, Wlodek, 1998, "Preference Logic and Radical Interpretation: Kanger Meets Davidson", in Lars Lindahl, Jan Odelstad and Rysiek Sliwinski (eds.), Not Without Cause Philosophical Essays Dedicated to Paul Needham on the Occasion ofHis Fiftieth Birthday, Uppsala Philosophical Studies 48, Uppsala University, Department of Philosophy. Ramsey, Frank, 1950, "Truth and Probabilit y", in his Foundat ions of Mathemat ics and Other Logical Essays, ed. by R.B. Braithwaite, Routledge & Kegan Paul , London , pp. 156-198. Rawling , Piers, 1996, "Davidson' s Measurement-Theoretic Reduction of the Mind", draft. Stoutland, Fredrick, forthcoming , "Davidson on Truth and Interpretation", a book chapter. Wilson , Neil, 1959, "Sub stances Without Substrata", Review of Metaphysic s 12, pp. 521-539. von Wright, Georg Henrik , 1963, The Logic of Preference, Edinburgh Univer sity Press, Edinburgh.
AMARTYA SEN
NON-BINARY CHOICE AND PREFERENCE: A TRIBUTE TO STIG KANGER*
1. INTRODUCTION
Stig Kanger was a philosopher of extraordinary power and creativity. In logic, in choice theory, in the theory of rights , and in many other fields, Kanger made far-reaching contributions which were profoundly important for the respective subjects. But he was not invariably a person of the greatest perseverance. He would often make an extremely innovative departure from the received tradition, but then move on to something else without staying on to finish the work he had started. This is especially the case with his deep and penetrating contributions to choice theory. His slender paper "Choice Based on Preference" - a thoroughly original contribution - was written some time in the middle 1970s (it will be called here Kanger I). It was seriously incomplete when it was first presented (with two sections of the text and the entire reference list missing), and it remained incomplete even at the time of his death more than a decade later. A subsequent paper "Choice and Modality" (to be called Kanger II) seemed like an attempt at completing the exercise, and it did extend the analysis, but it too needed more work which never carne.' In this paper, I want to talk about some specific aspects of choice theory that emerge forcefully from Kanger's ingenious contributions in this field . But given the incompleteness of the papers, this exercise must involve some speculation on what Kanger was really after. I am helped in this exercise by the discussions I had with him, first, at the London School of Economics in the mid-seventies, and later on, during my two visits to Uppsala in 1978 and 1987, respectively. In the next section, the standard models of binary and non-binary choice theory are briefly discussed, followed - in section 3 - by some reformulations reflecting Stig Kanger's ideas and suggestions. In section 4, the motivation underlying the reformulations are examined, and the importance of these departures is illustrated with particular substantive examples. The essay ends with a concluding remark on the over-all significance of Kanger' s departures. 243
G. Holmstrbm-Hintikka, S. Lindstrom and R. Sliwinski (eds.), Collected Papers of Stig Kanger with Essays on his Life and Work. Vol. II, 243-254. © 2001 Kluwer Academic Publishers. Printed in the Netherlands . Originally published in D . Prawit z, B. Skynns and D. Westerstahl (eds .) Logic, Methodology and Philosophy cf Science IX, Elsevier Science B.V., 1994, pp. 913-924.
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2. CHOICE FUNCTIONS AND BINARINESS At the risk of some over-simplification, the literature in choice theory can be divided into two categories in terms of what is taken to be "the primitive", viz, (l) some binary relation R (interpreted as "preference", or "value", or "objective", or "the utility relation" - something seen as prior to choice), or (2) the choice function C (.) itself.' These two standard approaches can serve as the background against which we see Kanger's departures. 2.1. Binary relation as the primitive Consider, first, the traditional view of "relational choice", basing choice on the primitive relation R in the standard way. A binary relation R ranks the set of available alternatives X from which a non-empty "menu" S is offered for choice, S ~ X and from this S an "optimal set" C(S, R) is chosen on the basis of the binary relation R. In fact, only one element of the optimal set must ultimately be picked, but the optimal set reflects the set of "chooseable" elements of S. (I)
C(S,R)={xlxES&VyES:xRy}
C(S, R) is sometimes called the "choice set" of S with respect to the binary relation R. The interpretation of C(S, R) depends on the content of the binary relation R. If, for example, R stands for the relation "at least as good as", then C(S, R) is the set of "best" elements in S. Here we move from a binary relation, taken as the primitive, to the derived choices. Within this general structure, the approach can vary with the characteristics of R, which mayor may not be complete, mayor may not be transitive, and so forth. The symmetric and asymmetric factors of R partition the different cases in which xRy holds into xPy and x1y. (2) (3)
xPy [xRy & not yRx] x1y [xRy & yRx]
If R is interpreted as at least as good as, then P can be seen as the relation "better than" and 1 as the relation "indifferent to" . In another variant of this approach of relational choice, the elements to be chosen may be specified as the set of "maximal" elements, rather than as the "optimal elernents".' In the case of choosing from the "maximal element" set, to qualify for choice, and element x has to be undominated by any other element (that is, for no y should it be true that yPx), even though xRy need not hold either.
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NON-BIN ARY CHOICE AND PREFERENCE
(4)
M(S,P)={xl x ES¬ ~Y ES: yPX}
The distinction between the maximal set M(S, P ) and the optimal set C(S, R) is helpful for relational choice for various reasons , but perhaps most of all because the optimal set C(S, R) might well be empty when R is incomplete. While reflexivity (requiring xRx for all x) may be trivial in the context of many cases in choice theory (it is, for example, hard to dispute that x is "at least as good as" itself), completeness certainly can be a really exacting demand. Even with incompleteness, the maximal set can sometimes exist even though the optimal set is empty. For e xample, if neither xRy, nor y Rx , then {x, y}, R) = 0 , whereas M({x, y}, R) = {x , y }. One type of preference relation much studied in choice theory is a "quasiordering", in which R is transitive but not necessarily complete. Kanger too has tended to take that type of relation as a good starting point of his analysis of "choice based on preference". For a quas i-ordering, an "optimal set" may well be empty even whe n a "maximal set" is clearly non-empty. Indeed, over a finite set S, a maximal set M (S, R ) will always exist for a quasi-ordering R (Sen 1970, Lemma 1*b). However, the following theorem holds (for a proof see Sen 1970, Lemma 1*d, pp. 11-12).
ce
(T . 1) For quasi-ordering R, ijC(S, R ) is non-empty, th en M (S, R )
The interest in the maximal set - as opposed to the optimal set arises when the optimal set does not exis t.
= C(S, R ).
particularly
2.2. Choi ce fun ction as th e primitive
In the alternative traditional approach, the primitive is taken to be the choice function itself, which is a functional relationship that specifies for any non-empty subset S of the universal set X, a "choice set" ceS), a subset of S. It is possible to obtain binary relation s of "revealed" or "underlying" preference, from such a choice function (by making some standard assumptions), and indeed there is quite a literature on this . For example x is weakly "revealed preferred" to y if and only if from some set of which y is a member, x is actually chosen (whether or not y is also chosen)". Further, x is weakly "base relation preferred" to y if and only if x is picked precisely from the pair {x, y}."
ce.)
Weak revealed preferen ce: (5 )
x RcY
[ ~S : x E C(S )
& yE S ]
Weak base relation : (6)
xRcY
[x E C( {x , y })]
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AMARTYASEN
The asymmetric and symmetric factors of R, (denoted P; and I, respectively) can be obtained in the usual way, following (2) and (3) applied to R; Similarly with Re . It is, in fact , also possible to define a strong revealed preference relation P" directly, in terms of x being chosen from a set that contains y but from which y is not chosen (that is, x is chosen and y rejected)."
Strong revealed preference: (7)
xp ey [::JS : x
E
C(S) & y
E
(S - C(S»]
2.3. Binary choice A choice function is binary if and only if the revealed preference relation R, generated by that choice function would generate back the same choice function if R, is used as the basis of relational choice. Invoking (1) and (5), binariness is defined thus.
Binariness of a choice function : A choice function is binary if and only if, for all S ~ X: (8)
C(S)
=C(S, Rc )
Various consistency conditions have been proposed for choice functions, such as the weak axiom of revealed preference, path independence, and so on. The following two elementary conditions are central for the binariness of a choice function.
Property a (basic contraction consistency): For all x in X and all S, T (9)
[x E C(X) & x
E
~
X,
T c S] = [x E C(1)]
Property y (basic expansion consistency): For all x in X and any class of sets Sj ~X:
(10)
[x E
nC(Sj)] = [x J
E C(
U Sj)] J
Prop erty a demands that if a chosen element x from a set S belongs to a subset T of S, then x would be chosen from T as well. Property y requires that if some x is chosen from every set S, in a class, then it would be chosen also from the union of all such Sj' The following result is easily established linking Properties a and y to binariness of choice for a complete choice function , that is, for choice
NON-BINARY CHOICE AND PREFERENCE
247
funct ions such that C(S) is non-empty for any non-emp ty S (see Sen 1971 and Herzberger 1973). (T .2) A complete choice fun ction is binary
if and only if it satisfies Properties
a and y.
Binariness can also be defin ed in terms of the base relation Re , rather than the revealed preferenc e relation Re , in exactly the same way, and it can be shown that "basic binariness" thus defined is equivalent to binariness with respect to the revealed preference relation and thu s equivalent to the combination of Properties a and y (on this and related matters, see Herzberger 1973). By varying the required prop erties, the choice functi on can be made less or more demanding than binariness.'
3. KANGER 'S DEPARTURES The basic variation that Kanger introduc es in this standard structure is the possib ility of choos ing according to a binary relation of preferenc e RV that depend s on the "ba ckgrou nd" set Vrather than being independent of the set of alternatives (as ass umed in the case of R considered in the last section). Whil e the choices are seen as being based firmly on bin ary relations, the parti cular binary relation to be used in the Kanger system varies with the background set V. The far-re aching significance of this variation will be considered in the next section. The present section is concerned mainl y with sorting out the formalities in Kanger 's formulation , which is rather complex and in some ways quite hard to follow.' I shall first present the logical sequence in Kanger ' s own presentation, but it will emerge that the main diffe rences introduced by him can be stated in anoth er - rather simpl er - way in terms of the standa rd format of choice theory. So if the reader is disinclined to go through a lot of forma lities, he or she could move strai ght on to equations (15) and (16) below. Kanger proceeds from a "primitive" notion of a dec ision function D, from which a choice function C is obtained. We shall call them D K and CK respectively, in honour of Kan ger. The different concepts can be perh aps more easily understood by invokin g a diagram of intersect ing sets V and X (at the cost of some loss of generalit y, which will not however affect the form al definition s prese nted here). We take S = V n X.
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AMARTYASEN
Figure 1 DK(V, X) are the elements of V that are no worse than any element of V-x (equivalently, V-S) according to the strict binary relation pV with respect to the
background set V. (1l)
DK(V, X)
= {x I XE V¬:::Jy E V-X :ypVx }
It is easily checked that the following relations hold : (12) (13)
=
DK(V, X) DK(V, S) DK(V, V-X) D\V, V-S)
=
The choice function CK is defined in terms of DK thus: (14)
CK(V, X)
=DK(V, V-X) n x
With the choice function CK thus established, Kanger proceeds to introduce more structure into the background-dependent preference relation pV: first the elementary need for this notationally "strict" pV to be irreflexive; then the requirement that pV be a strict partial ordering with no infinitely ascending chain; then it be also a semi-ordering; and finally that it be a strict weak ordering. He examines their various properties and relates them to the consistency conditions used in the standard literature (such as Properties a and y). The basic idea behind the choice function C K can be understood in more direct terms in the following way. Consider the maximal set M(S, P), defined earlier, in equation (4) . The strict preference relation P invoked there did not depend on any background set V. Now make it dependent on a selected background set V, and call it Define C*(S, V) simply as M(S, pV), exactly like a traditional maximal set, except for using pV rather than P .
r:
(15)
C*(S, V)
=M(S , pV) = {x IX ES & not:::Jy E S: ypVx }
Now bearing in mind that S is the intersection of V and X, it can be easily established that Kanger's Choice function CK relates to C* (and thus to the standard maximal function M) in the following way:
NON-BINARY CHOICE AND PREFERENCE
249
(T .3)
(16) The result is easily checked by comparing (15) with the characterization of CK(V, X) in the Kanger system, given by (17), based on (14) : (17)
CK(V, X)
= {XIX E VnX¬ ::Jy E VnX:yPVx}
Thus, we are essentially in the same territory as the traditional maximal function M(.) , with the added proviso that the strict preference relation Pis now a background dependent And bearing in mind the old result (T. 1) that the traditional maximal set M(S, P) is the same as the traditional choice set C(S, R) whenever the latter is non-empty and R is a quasi-ordering (Sen 1971), we have a clear relationship between Kanger's choice system and the standard system of choice sets and maximal sets. The Kanger system opts for the idea of maximality rather than that of optimality (underlying the traditional binary choice function) , and furthermore makes the binary relation of preference P" (on the basis of which maximality is defined) dependent on the specification of the background set V. The latter is a truly substantial departure, and in the next section the motivation underlying this change and its extensive importance are discussed and exemplified. But as far as formalities are concerned, we lose nothing substantial by using the simpler notion of a background-dependent maximal function M(S, p V ) , rather than CK(V, X), as in the Kanger system. The discussion that follows will be conducted entirely in these less specialized terms, using the older notion of maximality coupled with Kanger' s ideal of a background-dependent preference relation P".
r:
4 . WHY BACKGROUND DEPENDENCE? At the substantive level , the idea behind a background-dependent maximal choice M(S, pV), equivalent to Kanger's differently formulated choice structure, can be seen in terms of two distinct departures from the standard maximal choice M(S, P): (1) the preference relation P is taken to be dependent on a background set V in terms of which it is defined, and (2) the background set V need not be the set S (the menu) from which choice is being made. I shall briefly consider different types of motivations that can justify the broader conception of choice behaviour proposed by Kanger. Since Kanger himself has tended to shy away from motivational discussions in general, I cannot claim that these motivations explain why Kanger made his proposals. But nevertheless these motivational arguments help us understand some of the advantages
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AMARTYASEN
of the Kanger formulation over more traditional models of choice behaviour. Let us first consider the former departure without the second (i.e., background-dependence of preference when the background is required to be the menu itself). Take the preference relation pS to be dependent on the set S from which choice is being made: M(S, pS). This is already a considerable departure from the standard model of choice, given by C(S, R) or M(S , P), in which the preference relations Rand P are taken to be menu-independent (and of course, more generally, background -independent). This relaxed requirement can deal with cases in which the nature of the menu from which choice is being made can affect the ranking of alternative elements. The reasons for such menu-dependence of rankings can be diverse and they tend to be comprehensively ignored in the traditional models of binary choice. I present here briefly three quite different - and essentially independentreasons for menu-dependence of preference, which I have discussed more extensively elsewhere (Sen 1992).9 Positional choice: The ranking of alternatives may depend on the position of the respective alternatives vis-a-vis the others in the menu. For example, when picking a slice of cake from a set of slices, a cake-loving person who nevertheless does not want to be taken to be greedy may decide not to pick the largest slice, but choose instead one that is as large as possible subject to its not being the largest, to wit, she may choose the second largest slice.'? This type of choice would violate binariness and even the elementary condition of Property a (basic contraction consistency). If, for example, three slices of cakes are ranked in decreasing order of size as a over b and that over c, then from the menu (a, b. c), the person may pick b, and from (b, c) may choose c. There is nothing particularly "irrational" in such behaviour, even though these choices violate Property a and binariness. Similarly, a person may decide not to pick the last apple from an after-dinner fruit basket , having one of the pears instead, even though she may pick an apple from a larger basket containing many apples and many pears. Epistemic value of the menu: A person may accept the invitation to tea from an acquaintance she does not know well, but refuse that invitation to tea if the acquaintance were also to invite this person to have some cocaine with him. The addition of the latter invitation may give her some extra information about him which might make her more skeptical of the idea of having tea with him. The menu offered has informational value in ranking the individual courses of action . Again, we see here a violation of Property a and of binariness, but the reasoning is canny enough.
NON-BINARY CHOICE AND PREFERENCE
251
Valuation of freedom: The freedom a person enjoys depends on the nature of the menu open to her. The choice of courses of action may be influenced by the extent of freedom. For example, a person may choose to read a particular newspaper when she could read anyone she chooses (or none), and yet decide to protest and read none if she is forced to read that particular newspaper and no others. Contraction consistency and binariness are violated in all these cases, but there is no difficulty in explaining and rationalizing the choices in terms of "choice based on preference" when the preference relation pS depends on the menu from which choice is being made . These and other examples have been discussed and scrutinized elsewhere in terms of the particular properties of menu-dependent preference pS, but they are covered inter alia by the more general case of background-dependent preference pVproposed by Stig Kanger. Now we can turn to the case in which the background set V need not coincide with the menu set S. This is particularly Kanger territory. What can be the reason for choosing a background set that is different from the menu from which choice is being made? While Kanger himself has not discussed the motivational issues in his papers, possible reasons for the additional departure are not hard to seek. The menu tells us what we can choose from. The ranking of the alternatives may depend, however, on the role of the chosen alternatives after the choice has been made . For example, consider the problem of selecting tennis players to represent a country in the Davis Cup - an international tournament. What the selectors have to seek are not the best players in the country in terms of playing against each other, but the best players in terms of playing against tennis players from other nations. Consider a case in which players A and B can defeat players C, D, E and F individually and in pairs. That is a good reason for declaring them to be champion players within the nation. But it is still possible - given differences in the style of playing - that players C and D can defeat the Davis Cup team from the United States while the others cannot do that, and players E and F can defeat the Davis Cup players from Sweden, while the others cannot perform that feat. In that case, in picking Davis Cup players, there would be a good argument for picking C and D if it looks that this country will have to play against the United States, and for picking E and F if it appears that the contest will be against Sweden. The ranking relation p v must , thus, take note of the ranking of the domestic players not vis-a-vis each other, but of their abilities to play against the likely international competitors - the appropriate "background" in this case.
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AMARTYA SEN
Similarly, in selecting a poet laureate , the selectors may be guided not just by the merits of the likely candidates seen in terms of internal comparisons, but by the respective standings and comparative standards of these candidates vis-a-vis other well-known poets - including dead poets and lyricists from other nations . To take another type of example, in making admission decisions, a college may be guided not just by comparisons of the applicants against each other seen in purely internal terms, but also by comparing them to general categories of students whether or not applicants to this particular college. Many other types of examples can be easily presented. The common factor in all this is the need for external reference - external to the menu - in comparing the alternatives in the menu. It is that general possibility that the Kanger formulation of choice can capture in a neat and elegant way by explicitly bringing in the reference to a background set V that mayor may not coincide with the menu S. 5. A FINAL REMARK
In this essay I have briefly presented the special features of Stig Kanger's model of "choice based on preference". By presenting his formulation in a slightly different way, we can see it as an extension of the standard model of binary choice in terms of maximal sets with the binary relation of choice P" made dependent on a background set V which mayor may not coincide with the menu S. The departures, thus , involve three distinct elements: (1) use of maximality rather than optimality, (2) admitting menu dependence of preference , and (3) admitting dependence of preference on a set different from the menu itself. I have discussed the case for each of these departures, of which the last is most specific to Kanger's own work. I end with a final remark that while Kanger's formulation takes choice theory well beyond the limited framework of binary choice as it is standardly defined, the primitive notion that Kanger invokes is still a binary relation p v defined in terms of a specified background set. In this sense, Kanger's model can be seen as a generalized formulation of binary choice (as he calls it, "choice based on preference"). One of the implications of Kanger's analysis is the need to rethink on the requirements of maximization as the basis of decisions and choice. The Kanger framework violates the standard conditions of maximal choice quite robustly, but the differences arise not from rejecting any intrinsic feature of maximization as such, but from dropping the implicit presumption in the standard literature that the preference relation be background independent. In effect, Stig Kanger has shown that maximization is a much more general discipline
NON-BINARY CHOICE AND PREFERENCE
253
than theorists of maximization have tended to assume. That is the key to a different world of choice through maximization.
Harvard University NOTES For helpful discussions on this and related topics, I am most grateful to Nick Baigent , Ben Fine, Dagfinn Fellesdal , Wlodzimierz Rabinowicz, Ryszard Sliwinski, and of course - over many years - to Stig Kangcr himself. I Both the papers contained, in fact, a small error, which was detected and sorted out by Stig Kanger's associates, Wlodzimierz Rabinowicz and Ryszard Sliwinski, in a forthcoming volume of Scandinavian texts on decision theory and ethics, which will include Kanger's unpublished - and unfinished - paper "Choice Based on Preference" ; Porn et al. (1992). The "Introduction" also comments generally and illuminatingly on the nature of Kanger 's contributions to ~ecision theory. - The distinction applies to choice under uncertainty as well as certainty . However, in this ~aper I shall not go into the former: since neither ~f Kanger' s essays deals with uncertainty . . On the distinction between "optimal " and "maximal" see Dehreu (1959) , Chapter I, and Sen (1970) . 4 See Samuelson (1938), Arrow (1959), Hansson (1968), Herzberger (1973) . 5 Sec Uzawa (1956), Herzberger (1973) , Suzumura (1983). 6 See Arrow (1959), Suzumura (1983) . 7 For the main results , see Arrow (1959), Hansson (1968), Sen (1971), Herzberger (1973), Suzumura (1983). 8 Rabinowicz and Sliwinski point out in their introduction in Porn et al. (1992) that Kanger 's "reason for choosing such an artificial concept as D as his primitive" relates to "the close formal connection between D and modal operators studied in modal logic". Rabinowicz and Sliwinski discuss these connections, and they are indeed important for the formal side of Kanger's reformulation of the choice problem (see Kanger I and Kanger II). In this paper, however, I am mainly concerned with the substantive differences pursued by Kanger. See also Danielsson (1974) on related issues. 9 See also Sen (1982 , 1992), Elster (1983), Levi (1986) , Fine (1990), among others, for different types of reasons for menu-independence. 10 Positional valuation has been extensively investigated in the context of social choice by Gardenfors (1973) and Fine and Fine (1974) .
REFERENCES Arrow, K. J. (1959), "Rational Choice Functions and Orderings", Economica 26. Danielsson, S. (1974), Two Papers on Rationality and Group Preference, Philosophy Department, Uppsala University, Uppsala. Debreu, G. (1959), Theory of Value. Wiley, New York. Elster.J, (1983), Sour Grapes. Cambridge University Press, Cambridge. Fine, B. (1990), On the Relationship between True Preference and Actual Choice, mimeographed, Birkbeck College, London . Fine, B., and Fine, K. (1974), "Social Choice and Individual Ranking", Review of Economic Studies 41.
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Gardenfors, P. (1973) , "Positional Voting Functions", Theory and Decision 4. Hansson, B. (1968), "Choice Structures and Preference Relations" , Synthese 18. Herzberger, H. G. (1973), "Ordinal Preference and Rational Choice ", Econometrica 41. Kanger, Stig (1970s), "Choice Based on Preference ", mimeographed, Uppsala University (cited here as Kanger I). Kanger, Stig (1980s), "Choice and Modality", mimeographed , Uppsala University (cited here as Kanger II). Levi, I. (1986) , Hard Choices, Cambridge University Press, Cambridge . Porn, I. et al (1992), Choices , Actions and Norms. Conceptual Models in Practical Philosophy - Scandinavian Contributions, to appear. Rabinowicz, W., and Sliwinski , R. (1991), Introduction , Porn et al. (1992) . Samuelson, P.A. (1938) , "A Note on the Pure Theory of Consumers' Behaviour", Economica 5. Sen, A. K. (1970), Collective Choice and Social Welfare, Holden -Day, San Francisco; republished, North-Holland, Amsterdam (1979) . Sen, A. K. (1971), "Choice Functions and Revealed Preference", Review of Economic Stud ies 38; reprinted in Sen (1982) . Sen, A. K. (1982) , Choice, Welfare and Measurement, MIT Press, Cambridge, MA and Blackwell, Oxford. Sen, A. K. (1992), "Internal Consistency of Choice", 1984 Presidential Address to the Econometric Society, forthcoming in Econometrica 1993. Suzumura, K. (1983), Rational Choice, Collective Decisions , and Social Welfare. Cambridge University Press, Cambridge . Uzawa, H. (1956), "A Note on Preference and Axioms of Choice" , Annals of the Institute of Statistical Mathematics 8.
NOTES ON THE CONTRIBUTORS
Lennart A.qvist received his Ph.D. in 1960 and has since then been Docent of Practical Philosophy at Uppsala University. He has also taught at Lund University and Abo Academy and has been a Visiting Professor at Brown University and the University of Stuttgart. For the last twenty years he has been working on projects in linguistics and in the logical reconstruction of legal reasoning. Aqvist's areas of interest include philosophical logic , lingu istics , philosophy of language, ethics, philosophy of law and epistemology. Among his publications are A New Approach to the Logical Theory of Interrogatives (Tubingen 1975) and Introduction to Deontic Logic and the Theory of Normative Systems (Napoli 1987), as well as Causing Harm : A Logico-Legal Study (with Philip Mullock, Berlin, 1989). Jan Berg earned a Ph .D. in Theoretical Philosophy at Stockholm University in 1962 during the period when Stig Kanger upheld a Docentship there. He then taught at the University of Minnesota and at Stockholm University until 1969 when he was appointed Professor of Philosophy at the Technische Universitat Munchen. He has published extensively on history of philosophy, logic, philosophy of science, and general philosophy, and he is a leading expert on Bolzano's philosophy. Also high on his list of credits is a Black Belt in Judo. Brian F. Chellas is Professor Emeritus of Philosophy at the University of Calgary. He received his Ph.D. from Stanford and later taught at the Universities of Pennsylvania and Michigan. He is the author of Modal Logic: An Introduction (Cambridge University Pres s 1980) and many papers in philosophical logic as well as a book on chord systems for the guitar. Anatoli Degtyarev is a Docent at Kiev University and also a visiting researcher at Manchester Metropolitan University. His main research area is automated reasoning. He has made a number of contributions to equational theorem proving, including the discovery of basic paramodulation and results on theorem proving with rigid variables.
255 G. Holmstrom-Hintikka , S. Linstrom and R. Slivinski (eds.), Collected Papers ofStig Kanger with Essays on his Life and Work, Vol. 1/, 255-259. © 2001 Kluwer Academic Publi shers. Printed in the Netherlands.
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NOTES ON THE CONTRIBUTORS
Lars Gustafsson became a Ph.D. in Theoretical Philosophy at Uppsala University in 1978 with Stig Kanger as supervisor. Since 1981 he has been Professor of Germanic Languages and Philosophy at the University of Texas where he is currently Jamail Distinguished Professor. Besides being a scholar, he is a prominent Swedish poet and prose writer, with many of his works translated into other languages. Soren Hallden is Professor Emeritus of Theoretical Philosophy at Lund University. He received his Ph.D. in Theoretical Philosophy from Stockholm University in 1950 and was a Docent at Uppsala University until 1964 when he was appointed to the Chair of Theoretical Philosophy at Lund University. He has published extensively in the fields of philosophical analysis, decision theory, philosophy of science, and philosophical logic. His latest book is Truth Strategy Simplified (Thales 1999). Kaj Barge Hansen earned his Ph.D. in Theoretical Philosophy at Uppsala University in 1996. The same year, he became Docent of Logic at Uppsala. He has taught at the Universities of Uppsala, Stockholm and Lulea, and has been a Visiting Professor at the University of Tartu and at the Universidad Nacional del Sur in Bahia Blanca. Among his publications are Logical Physics: Quantum Reality Theory (Thales 1996), Applied Logic (Uppsala 1996) as well as a textbook of logic and several articles on pure and applied logic and philosophy of science . Sven Ove Hansson, Professor of Philosophy at the Royal Institute of Technology, Stockholm, was one of Stig Kanger's graduate students. He is the author of Setting the Limit (Oxford University Press 1998), A Textbook of Belief Dynamics (Kluwer 1999), The Structure of Values and Norms (Cambridge University Press, in press), and articles on subjects such as preference logic, deontic logic, decision theory, philosophy of risk, and belief revision. He is the editor of Theoria. Risto Hilpinen, previously Professor of Theoretical philosophy at Torun Yliopisto, is Professor of Philosophy at the University of Miami and has held visiting appointments at many other universities. He has written papers on philosophical logic, epistemology, and the philosophy of science, and edited books in these areas, for example, Deontic Logic (Reidel 1971), Rationality in Science (Reidel 1980) and New Studies in Deontic Logic (Reidel 1981). He is an editor of Synthese.
NOTES ON THE CONTRIBUTORS
257
Jaakko Hintikka is Professor of Philosophy at Boston University. He has held professorial appointments at the University of Helsinki, the Academy of Finland and Florida State University. From 1965 to 1982 he was associated with Stanford University. He is the principal founder of epistemic logic and game-theoretical semantics and a pioneer of possible worlds semantics, though he has published widely in other areas such as philosophy of language, epistemology, inductive logic, philosophy of science , philosophy of mathematics and history of philosophy. He has authored or co-authored over 30 books and monographs and more than 300 scholarly papers. He is the editor of Synthese and Synthese Library . Ghita Holmstrom-Hintikka was one of Stig Kanger's graduate students and received her Ph.D. in Theoretical Philosophy from Uppsala University in 1991. She is Adjunct Associate Professor of Philosophy at Boston University and Docent of Ethics and Philosophy of Religion at the University of Helsinki. Her dissertation, Action, Purpose, and Will, was published in 1991. She has also written papers on action theory, legal philosophy, applied ethics and medieval philosophy. She is the editor of Medieval Philosophy and Modern Times (Kluwer 1999) and a co-editor of Contemporary Action Theory (Kluwer 1997) as well as the guest editor of Communication and Cognition, "Legal Argumentation" (1995) . Lars Lindahl is Professor of Jurisprudence at the University of Lund, Sweden . He has a background in law as well as in philosophy. His book, Position and Change: a Study in Law and Logic (Reidel 1977) was his Ph.D. thesis at the University of Uppsala, written with Stig Kanger as supervisor. Sten Lindstrom received his Ph.D. from Stanford University in 1981, and is Professor of Theoretical Philosophy at Umea University. He has held teaching appointments at the universities of Uppsala and Lund and been a Research Fellow at the Swedish Collegium for Advanced Study in the Social Sciences in Uppsala. He has written papers on intensional logic, belief revision, and the philosophy of language, and co-edited the book Logic, Action and Cognition (Kluwer 1997). Ingmar Porn is Professor Emeritus of Philosophy at the University of Helsinki. He obtained his first Ph.D. from University of Birmingham in 1970 and his second from Uppsala University in 1977. Before being appointed to the Swedish Chair of Philosophy at the University of Helsinki, he taught at the University of Birmingham and at Uppsala University. He is the author of The
258
NOTES ON THE CONTRIBUTORS
Logic ofPower (Blackwell 1970) and Action Theory and Social Science: Some Formal Models (Reidel 1977).His research interests are in philosophical logic, social philosophy and philosophy of health.
Dag Prawitz has been Professor of Philosophy at the University of Oslo and is now Professor of Theoretical Philosophy at Stockholm University. As a student at Stockholm University he worked for a while in the field of automatic deduction, which is the topic of his note in this volume. His main work in logic has been in the field of general proof theory. More recently he has been interested in theory of meaning, to which he has applied some ideas from proof theory. Wlodek Rabinowicz started his philosophical studies in Warsaw, then gained his Ph.D. from Uppsala University in 1979, and is currently Professor of Practical Philosophy at Lund University. His research interests are in moral philosophy, decision theory and philosophical logic and he has published extensively in each of these areas. Currently, he is involved in a research project on sequential choice. He is the author of Universalizability: An Essay in Morals and Metaphysics (Reidel 1979) and is a co-editor of the journal Economics and Philosophy. Krister Segerberg was Professor of Philosophy at Abo Academy and then the University of Auckland before succeeding Stig Kanger to the Chair of Theoretical Philosophy at Uppsala University. Most of his publications are in philosophical logic, including two books, An Essay in Classical Modal Logic (Uppsala 1971) and Classical Propositional Operators (Clarendon Press 1982). He is an editor of the Journal of Philosophical Logic . Amartya Sen received his doctorate from the University of Cambridge in 1959 and has been professor in India, the U.K. and the U.S. Before becoming Master of Trinity College , Cambridge, in 1998, he was Lamont University Professor and Professor of Economics and Philosophy at Harvard University. He was awarded the Nobel Prize in Economics in 1998 for his contributions to the theory of social choice and his work on poverty . Rysiek Sliwinski was an assistant to Stig Kanger and also one of his graduate students. Currently he holds a teaching position in Theoretical Philosophy at Uppsala University. His research deals with paradoxes in game theory and doxastic paradoxes. He is an editor of Uppsala Philosophical Studies.
NOTES ON THE CONTRIB UTORS
259
Soren Stenlund is Professor of Theoretical Philosophy at Uppsala University. He is the author of Combinators, A-terms and ProofTheory (Reidel 1972) and of Language and Philosophical Probl ems (Routledge 1990) and has published several other books and articles on various themes in the philosophies of language, logic and mathematics. Problems concerning the nature and history of philosophy are other themes dealt with in his publications. In 1974 he edited Logical Theory and Semantic Analysis (Reidel 1974), the Festschrift dedicated to Stig Kanger on his fiftieth birthday. Goran Sund holm was educated at Lund, Uppsala and Oxford. He is currently the Professor of Logic in Leyden University, having previously held posts at Oxford, Nijmegen and Stockholm. He is the author of numerous articles on philosophy of mathematics, as well as on the history and philosophy of logic , and he has been a visiting professor at Stockholm, Campinas and Siena. In 1992 he edited (jointly with Joachim Schulte) a Festschrift for Brian McGuinness.
Andrei Voronkov recei ved his Ph.D. in mathematical logic in 1987 . Then he worked in the Institute of Math ematics (Novosibirsk), International Laboratory of Intelligent Systems (No vosibirsk), European Computer Indu stry Res earch Centre (Munich) and Uppsala Univer sity. Since 1999 he has been Professor of Formal Methods at the University of Manchester. He has worked in several areas of logic and computer science, including automated reasoning, logic programming and database theory. He is a co-editor of the Handbook of Automated Rea soning , to be publi shed by Elsevier Science and MIT Press.
INDEX OF NAMES
Ackermann, W. 37, 62 Aczel , P. 78 ,83,86 Alchourr6n, C. E. 174 Anand, P. 219 Anderson ,A.R. 4,139,163 -169,170 Anscombe, G. E. M . 163, 170 Anselm 146 Aqvist, L. 25 -28,42,142,147,173 -1 83 Aristotle 15,39 Arrow, K. J. 253 Austin, J. 151,169 Bachmair, L. 62 Baihache, P. 177 Barcan Marcus, R. 98 - 100, 119, 169 Barwise, J. 35 Bell , J. L. 23 8 Belnap, N. 142, 147 Bend ix, P. 62 Bentham , J. ] 5] , ] 69 Berg, J. 13- 15 Bem ays, P. 32, 35, 39, 53 Beth, E. W. 15,32- 33, 35,41,58, 60 Bjorkdahl , L. 3 Bo1ker, E. 230-232,237-238 Bo1zano , B. 14-15 Boolos, G. 128 Broom e, J. 241 Bulygin , E. 141,146,174 Carm o, J. 147 Carn ap, R. 11,98 -1 00 , 103, 126 Carson , D. 62 Chell as, B. 23 -24, 145, 192 Chellas, M . 23 Ch urch, A. 8, 32,37, 40, 42 Cocchiare lla, N . 127 Cresswe ll, M. 1. 128,1 70 Dahlquist, T. 25 ,22 1 Dalen , D. van 37
Daniel sson , S. 169,219,253 Dav idson, D. 221 - 242 Davis, M. 57 Debreu, G. 253 Degtyarev, A. 5] ,53 -67 Dil worth , C. 5 Dumrn ett, M. 35,41 Dyson , V. 35, 4 1 Eck , J. A. van 177 Elster, J. 253 Ess ler, W. K . 15 Etchemendy , J. 109 Fermullcr, D. 57 Fine, B. 253 Fine, K. 253 Fitch , F. B. 169 Fitt ing, M. 57 Fe llesdal , D. 97 Fraenk el , A. 32 Frie dman , \-I. 35 Gallier, J. 59 Gandy, R. 32 Ganzinger, H. 62 Gardcnfors, P. 219 , 253 Garson , 1. W. 128 Gent zen , G. 31 - 35, 40 , 54 , 63 , 97 Gilm ore, P. 57 Girard , J.- Y. 36, 54 Godel , K . 8,32, 34,35, 4 1, 53, 97 Gold ing, M. 169 Gou bault, J. 59 Gur evich, Y. 59 Gu stafsson , L. 5, 2 I - 22 Hagerstro rn, A. 5, 26 Ha ilperin, Th. 39 Halld en, R. 11 Hallden, S. 11-1 2, 206
262
INDEX OF NAMES
Hansen, K. B. 5,29 -30,69 -86,120 Hansson, B . 167, 169, 170, 173-174, 182,206-207, 211, 253 Hansson, S. O. 5,169,205 -219, 240 Hart, H. 143, 169, 175 Hedenius, 1. 25 Henkin, L. 34,39,41 ,89 Herbrand, 1. 32 Hermes, H. 32 Herzberger, H. G. 253 Hilbert, D. 32, 35 Hilpinen, R. 26- 27, 131- 149 Hintikka,1. 26,32- 33, 53, 60, 87- 95, 97, 101. 104-108, 127, 131 -132, 136137,146 Hodges, W. 33 Hoepe1man, J. 177 Hohfeld, W. N. 140,151. 168, 169, 173, 175 Holmstrom-Hintikka, G. 5, 169, 170, 185-204 Honore, A. M. 143 Horty, J. 142 Hughes, G. E. 128,170 Jefrrey,R.230-232,237-238,240-241 Jennings, R. E. 218 Jervell, H. 36, 42 Jones, A. 1. 1. 143, 185, 147 J6nsson, B. 101, 127 Jergensen, J. 146 Joyner, W. 57 Kallick, B. 57 Kamp, H. 136 Kanger, Dagmar 6 Kanger, Elisabeth (Li) 6 Kanger, Gustav 3-4 Kanger, Helle 5,6,17,23 -24, 139, 141, 147, 169, 185 Kanger, Kim 6,23 -24 Kanger, Neita 6 Kanger, Rune 3 Kanger, Sally 3-4 Kanger, Thomas 6 Kant,T, 15 Kaplan, D. 119 Karlsson, Gustav 3-4 Kent, C. F. 35,41
Ketonen, O. 34, 41, 63 Kirchsteiger, G. 219 Kleene, S. K. 8,32,34, 56,57, 100 Knuth, D. 62 Komerup, Helle 6 Kreisel, G. 35,36,41 , 124, 128 Kripke, S. 97, 104-108, 113, 117, 123126, 127, 128 Leblanc, H. 38- 39 Leibniz, G. W. 87,98, 134, 138-139 Leitsch, A. 57 Levi, 1. 232, 253 Lewis, D. 128 Lifschitz, V. 59,63 Lindahl, L. 5,28,140-141 , 145, 151171,173 -176,182,185 ,203 Lindstrom, 1. 5 Lindstrom, S. 5, 40, 97-130, 136, 146, 215 Lopez-Escobar, E. G. K. 35 Lukasiewicz, J. 32 MacCormick, N. 169 McGee, V . 127 Makinson, D. 141,146,169-170,173 174,176,182 Makkai, M. 35 Malcolm, N. 8 Marcus, R. B. 98-100, 119, 169 Marc-Wogau, K. 5,17 MasJov,S. 57-60 Matulis, V. 60 Mill, J. S. 157, 163, 169 Mints, G. E. 36, 38, 58, 60, 63 Molander, B. 5 Monk, J. D. 89 Montague, R. 97, 101 - 104, 127 Mostowski, A. 80 Mullock, Ph. 27,142, 147 Narendran, P. 59 Needham, P. 5 Nelson, G. 62 Neumann, J. von 87 Nordenfelt, L. 5 NorgeJa, S. 60
IND EX OF NA MES
Odelstad, J. 5 O fstad, H . 11
Opferman, W. 169 Oppen, D. 62 Orevkov, V. 58, 63 Perloff, M. 142 Petrini, Neita 6 Pettersson, I. 3 Phalen, A. 5 Plaisted, D. 59 Plato 15 Porn, I. 5, 19, 28, 142-1 43, 169, 185, 192,203 Post, E. 32 Prawitz, D. 34-35, 4 1,43-52,57 Prawitz, H. 45, 51, 57, 58 Puppe, C. 2 19 Putnam, H. 57
Quine, W. V. O. 5,60, 116,227 -229 Raatz, S. 59 Rabinowicz, W. 2 10,2 13,22 1-242,253 Ramsey, F. P. 229-23 1 Rawling, P. 24 1 Resch er, N. 170 Robinson, G. 62 Robinson , J. A. 49 -50 Ross, A. 146 Samuelson , P. A. 253 San tos, F. 147 Schlick , M. 32 Scholz, H. 31 - 32,40 Schutte, K. 32 - 33, 53, 60 Scott , D. 23 , 35 Scarle. J. 133 Segerberg, K. 3 -9, 142, 146, 147 Sen, A. 15, 211 , 243- 254 Sergot, M. 147 Shalla, L. 62 Shanin, N. 58 Sh oen field , J. R. 35, 4 1 Shostak, R. 62, 63 Sibelius, P. 5 Simp son , S. G. 36 Skolem , T. 32 Sliwinski, R. 2 13,253
263
Slomson, A. B. 238 Smu llyan, R. 33 ,57 Snyde r, W. 59 Soderberg, Dagmar 6 Stenius , E. 5, 8, 35 Stenlund, S. 5, 17- 18,27 Stevenson, C. L. 26, 169 Stoutland, F. 240 Sundholm, G . 3 1- 42, 43 Suzumura, K. 253 Svensson, Sally 3-4 Swart, H. de 35,41 Szewak, E. J. 169 Tait, W. W. 35, 4 1 Takahashi, M. 41 Takcuti, G. 35,4 1 Talj a, J. 169 Tammet, T . 57, 63 Tarski, A. 8,25,3 1-32,39,88 -89, 97, 101-103,1 27 Tuck, R. 162, 169 Turin g, A. 32 Uzaw a, H. 253
Vaught, R. 32 Veanes, M. 59 Veldman. W. 35 Voghera, N. 45 ,5 1,57 Voronkov, A . 5 1,53-67 Wang, H. 57 Wed berg, A. 4,7 - 8, 32,40,44,51 , 97, 174 Westermarck, E. 5, 8 Wh ite, A. R. 162, 167, 169 Wilson, N. 227 Wittgenstein, L. 8, 17- 18, 32 Wos , L. 62 Wright, G. H. von 5, 134, 142, 146- 147, 169, 206, 218 Za mov, N. 57 Zermelo, E. 32, 80, 85
SUBJECT INDEX
V*3*-formulas 57 "A note on prefere nce logic" (1980 ) 205 , 209-2 11 "A note on quantification and modality" (1957) 113 "A simplified proof method for elementary logic " ( 1963) 43 ,47,50,53 ,55 ,6 1 Absolute infinity 122 Accessibility relation 100, 106, 111, 121, 132 Ackermann ' s axiom of choice 37 Action 139, 147, 194-195,201 -202,203 Action , logic of 146, 185- 204 Action, modes of 139, 147 Action , theory of 5,27,146,1 85-204 Admissible set 35 Aesthet ics 5 Agency 139,141 -142,152,187 Agent 152, 147, 187 Agent causation 187- 189, 201 -202 Algebraic logic 14, 15,87 -95 Altemativeness relation 132, 138 "An algebraic logic calcu lus" (1966 ) 87, 88,218 Analytic necessity 108, 111, 138 Analytic philosophy 7, 19,28 Analytic/synthetic 15 Analytic truth 112 Anti-foundation axiom (AFA) 80 At least as good as 205 Autologicality 75 - 76 Automat ic deduc tion 43 - 52, 53 - 67 Background set 2 12-213,215,216-218, 219 , 247 -252 Backward method 33 -36,44-46,54,57, 73 -74 Barcan formula 99, 107, 136 Bearer of right 157- 159, 173 Befugnis 161 Beth-Hintikka-Kanger-Schiitte proof 33, 35
Better than 205 Boolean algebr a 237 -239 Capacity 198 Ceteris paribus preference 225 -226,240 Charity , principle of 227 "Choice and modality " (1976) 205 , 211 2 18,243 "Choice based on prefere nce" (1970s ) 205,21 1-218,243,253 Choice functio n 211 -214,244-247 Cho ice, theory of 205 -2 19,243-254 Church 's theorem 100 Claim 140,154, 157-158, 160,174-179, 186, 187 Class domain semantics 120-123 Completeness 74,81 ,84 Comple teness theorem 32, 40 , 43, 53 - 54, 74, 78,81 - 83,97 Condition 152,169, 218 Conditional 170 Constru ctive philosophy 19, 28 Contr action 54 Cord 76 Counter-capacity 198 Cou nter-claim 154, 187 Co unter-freedom 154, 187 Counter-im munity 154 -1 55, 187 Counter-model 34, 54 Counter-party 157-1 59,1 67 - 168,173 Counter-po wer 154- 155, 187 Counter-security 198 Cumulative type structure 7 1,84,85 Cut elimination 34, 35, 43 Cut-free system 40 , 54, 57 Cylindric algebr a 39,88 -89, 169 Decision function 247 - 248 Decision procedur e 57 Decision theory 15,205 -219,229 -23 1, 243 -254 Decoration 79 - 80
266
SUBJECT INDEX
Demodulation 62 Deonticlogic 26-27,131 -149,176-177 Deontic operator 135 Domain 100,111,120,121 ,1 32 Do-operator 139,141 , 144, 152, 191,201 Dummy 47,58 Dummy method 46- 50, 58 Duty 156-157,178 -179 Educator, Kanger as 5-6,8 -9,13 -14,17, 19,21 -22,29-30 Efficient proof procedure 43-52,53 -67 "En studie i modallogik, med sarskild hansyn till 'bora' -satser" (1951) 4, 138 Epsilon-calculus 38 Equal in value to 205 Equality 58- 63, 84 Equality, predicate logic with 58-63, 84, 85 Equality, predicate logic without 58, 60, 69-70,85 "Equational calculi and automatic demonstration" (1970) 87 Ethics 5,26-27, 139 Exchange 54 Extensionality, axiom of 76 Extensionality, weak axiom of 76 Foundation axiom (FA) 80,84 Four levels-assumption (4L) 221- 222 Frame 71 Free variable 58 Freedom 140, 154, 187 Gamble 229-230 Gamma-rule 57- 58 General predicate logic 71 Gentzen' s Hauptsatz 34,43,97 Government 141 Graph 78-79 Graph, accessible pointed (APG) 79 Graph, pointed 79 Graph, well-founded 80 Hagerstrom lectures 5, 234 Handbook ofLogic (1959) 32, 37, 40, 43. 47,53 ,61 Hintikka set 33, 131 Human right 141 ,151
Humboldt award 15 Identity 58-63,84 Identity postulate 73 Identity, predicate logic with 58-63, 84, 85 Identity, predicate logic without 58, 60, 69-70,85 Immunity 140, 154-155, 186, 187 Imperative operator 135 Implicationallogic 38-39 Independence friendly(IF) first-order logic 90-94 Individual concept 114 Infinitary logic 35 Influence 195-196,198-202 Interpolation of exclusive disjunction (lED) 221- 222, 240 Interpolation of exclusive disjunction of incompatibles (lED!) 224, 239 -240 Interpolation of inclusive disjunction (10) 240 Interpretational semantics 109-110 Intuitionistic logic 35 Invertible rule 56 Jergensen 's dilemma 146 Judgement 203 Kanger model I I 1-112 'Kanger', origin of the name 3 Kripke model 101, 106 "Law and logic" (1972) 27, 139, 169, 173,175,189-190,193 ,195,196,200 Law, philosophy of 139 Legal power 159 Level saturation 57 Liberty 186 Lindenbaum algebra 238-239 Logic programming 49- 50, 85 Logical consequence 112, 121, 169 Logical necessity I 11, 123- 126 Logical truth 72-74,81 ,112,121 -123 Lowenheim-Skolem theorem 77.97 Meaning theory 4 Measurement theory 4 Membership relation 71-75, 85
SUBJECT INDEX Metaling uistic interp retation 108 Metaphysical necessity 107- 110, 123126 Metaphysical possibility 107- 1 IO Metavariab le 58 Minus-no rmalisation 60 Modal logic 4, 97-130,2 14-216 Modal operato r 135 Model 31-36 Model set 33, 105, 131 Model theory 31- 32, 69- 86, 97 Morning star paradox 115- 119 Mostowski colla psing lemma 80 Name 112 Net 14, 75- 78, 79, 85 Net, elementary 76 Net, extensiona l 76 Net, main structure of 76 New Foundations for Ethical Theory (1957) 23,26, 131, 134, 136, 137139, 14 1, 146, 151, 173, 175, 185186,199 Non-well- founde d sets 14, 69- 86, 120 Object-level interpre tation 109 Obligation 177, 131, 132 Omega-rule 35, 39 "On the charac terization of modalities" (1957) 113 "On realiza tion of huma n right s" (1985) 139, 151,1 69 Ontological modal operato r 11 2 a -right 153-1 54,1 58, 165-1 66 Ought 132,1 38,1 63 Ought-operator 4, 132, 135, 138, 163, 190 Paramod ulation 62 Parliamentarism 141 Performative 135- 136 Permission 131, 177 Petaluma 167, 179-1 83 Philosoph ising, style of 4- 5, 8, 14-15, 17-1 8, 19, 23, 25, 28, 29- 30 Phonematics 5 Picture of set 80 Possible world 97,98, 105-108, 132 Possible worlds semantics 105- 108 Power 140,1 54- 155,1 86,1 87,1 95
267
Predicate 112 Preference, theory of 5,205 -2 19,221 242,243-254 "Prefere nce logic" (1968) 205 -209 Preference, logic of 205-2 19,22 1-242, 243-254 Preference relation 221,244-247 P-right 153-1 54, 158,1 65- 166 Privilege 140, 179, 186 Proof 73 Proof theory 3 1- 42, 43-52,53 - 67,69 86 Proposition 112 Propositional attitude 107 Provability in Logic (1957) 4,43-44,53 54, 55, 5~ 69, 87,97, 10~ 113, 11 ~ 127,1 46 Quantifiers 57,87- 95, 97- 130, 136- 137 Quantifying in 11 3-119 Quasi-de duction 73 Quasi-sequent 70 Radical interpret ation 226 - 227 Range 131-1 32 Representational semantics 109- 110 Resolution 49- 50 "Rights and parliamentarism" (1966) 139, 169,1 73,1 85,1 87 Rights, theory of 5,27, 139- 141,15 1171,173 -183 Rights, types of 139-1 40,1 53-1 56,1 64166,1 87 Rigid designator 106 Rigid E-unification 59-61 , 63 Sati sfaction sema ntics 133-1 34 Second-order logic 37-38 Security 198 See to it that 139, 145, 152, 169, 185, 190, 192, 197 Self-reference 75- 76 Semantic tableau 33 Semantics 3 1- 36, 7 1- 73, 97- 130, 193 Semi-valuatio n 33 Separation problem 38- 39 Sequent 33, 54, 70 Sequent calculus 33- 34, 43, 50, 54, 57, 58-63, 73
268
SUBJECT INDEX
Seriality 132, 138 Set domain semantics 120-123 Set, heriditarily finite 80 Set, non-well-founded 80 Set structure 77 Set theoretical principle , Kanger's 77-78, 81,84 Set theoretical principle, weak 81, 82, 84 Set theory 69- 86 Set, well-founded 80 Shall-operator 152, 163, 190 Sheffer's stroke 234 Simplification 62 Simultaneous paramodulation 62 Simultaneous replacement 62 Skeleton instantiation 59-60 Social philosophy 139 "Some aspects ofthe concept of influence" (1977) 169, 196, 197 Soundness 74, 84 Source of law 173,175 -176 Stability axiom 217 State of affairs 152 State-description 98-99, 126-127 Structural rules 54- 56 Structure (arbitrary) 72, 83, 84 Structure, normal 72, 83, 84 Subterm instantiation 58,60-61 Supervalidity 128 Synthetic philosophy 7 System 100, Ill , 121, 132
"The morning star paradox " (1957) 98, 113-115 "The notion of a right" (1963) 151, 162, 169,185, 187 Theorem of LC 73 Tree 79 Truth and prescriptions 133-134 Type 70-71 "Unavoidability" (1986) 169, 195,200 Unavoidability 177,186,190,199-201 Unification 50, 58 Uniform word problem 62 Validity 72-73,74,112,121-123 Valuation 72, 100, Ill , 120, 127, 132 Valuation , normal 72 Variable instantiation 57- 58 Weakening 54 Will theory 161
SYNTHESE LIBRARY I. 2. 3. 4. 5. 6. 7. 8. 9. 10.
II . 12. 13. 14.
15. 16. 17. 18.
J. M. Bochenski, A Precis of Mathematical Logic. Translated from French and German by O. Bird. 1959 ISB N 90-277-0073-7 P. Guiraud, Problemes et methodes de la statistique linguistique. 1959 ISB N 90-277 -0025-7 H. Freudenthal (ed.), The Concept and the Role of the Model in Mathematics and Natural and Soc ial Sciences. 1961 ISBN 90-277-0017-6 E. W. Beth , Formal Methods. An Introduction to Symb olic Logic and to the Study of Effe ctive Operations in Ari thmetic and Logic. 1962 ISBN 90-277-0069-9 B. H. Kazemi er and D. Vuysj e (eds .), Logic and Language. Studies dedicated to Profe ssor ISBN 90-277-0019-2 Rudolf Camap on the Occasion of His 70th Birthday. 1962 M . W. Wartofsky (ed .), Proceedings of the Boston Colloquium f or the Philosophy of Science, 1961-1962. [Boston Studi es in the Philosophy of Science, Vol. I] 1963 ISBN 90-277-0021-4 A. A. Zinov'ev, Philosophi cal Problems of Many-valu ed Logic. A revised edition, edited and translated (from Russian ) by G . Kling and D.D. Corne y. 1963 ISBN 90-277-0091-5 G . Gurvitch, The Spect rum of Social Time. Translated from French and edited by M. Korenbaum and P. Bosserman. 1964 ISBN 90-277-0006-0 P. Lorenzen, Formal Logic. Tran slated from German by F.J. Crosso n. 1965 ISBN 90-277-OO80-X R. S. Cohen and M . W. Wartofsky (eds .), Proceeding s ofthe Boston Colloquium for the Philosophy of Science, 1962-1 964. In Honor of Philipp Frank. [Boston Studies in the Philosophy ISBN 90-277-9004-0 of Scien ce, Vol. II] 1965 E. W. Beth, Mathemat ical Thought. An Introduction to the Philos oph y of Mathematics. 1965 ISBN 90-277-0070-2 E. W. Beth and J. Piaget , Mathemat ical Epistemol ogy and Psychology. Tran slated from French by W. Mays. 1966 ISBN 90-277 -0071 -0 G. Kling, Ontology and the Logisti c Analysis of Language. An Enqu iry into the Contemporary Views on Univer sal s. Revised ed., tran slated from German. 1967 ISBN 90-277-0028 -1 R. S. Cohen and M. W. Wartofsky (eds .), Proceedin gs of the Boston Colloquium for the Philosophy ofSciences, 1964-1966. In Memory of Norw ood Russell Han son. [Boston Studies ISBN 90-277-0013-3 in the Philosophy of Science, Vol. III] 1967 C. D. Broad, Induction, Probab ility, and Causation. Sele cted Papers. 1968 ISBN 90-277-0012-5 G. Patzig, Aristotle 's Theory ofthe Syllogi sm . A Logical-philosophical Study of Book A of the Prior Analytics. Translated from German by J. Bames. 1968 ISBN 90-277-0030-3 N. Rcscher, Topics in Philo sophical Logic. 1968 ISBN 90-277-0084-2 R. S. Cohen and M. W. Wartofsky (ed s.), Proceedings of the Boston Colloquium for the Philosoph y of Science, 1966-1968, Part I. [Boston Studies in the Philosophy of Science,
Vol. IV] 1969 t9.
20. 21. 22. 23 .
ISBN 90-277-0014-1
R . S. C o hen and M . W . W arto fsky (e ds .) , Proceedi ngs of th e B o st on Colloq u ium fo r th e
Philosophy of Science, 1966-1 968, Part II. [Boston Studi es in the Philo soph y of Sc ience, Vol. V] 1969 ISBN 90-277-0015-X J. W. Davis, D. J. Hockn ey and W. K. Wilson (eds.), Philosophical Logic. 1969 ISBN 90-277-0075-3 D. Davidson and J. Hintikka (eds. ), Words and Objections. Essays on the Work of W. V. Quine. 1969 , rev. ed. 1975 ISB N 90-277 -0074- 5; Pb 90-277-060 2-6 P. Suppes, Studies in the Methodology and Foundations ofScience. Selec ted Papers f rom 1951 to 1969. 1969 ISB N 90-277-0020-6 J. Hint ikka, Models fo r Modalities . Selected Essays. 1969 ISB N 90-277-0078-8; Pb 90-277-0598-4
SYNTHESE LIBRARY 24. 25. 26. 27. 28. 29. 30. 31. 32. 33. 34. 35. 36. 37. 38. 39.
40. 41. 42. 43. 44. 45. 46.
47.
48.
N. Rescher et al. (eds.), Essays in Honor of Carl G. Hempel . A Tribute on the Occasion of His 65th Birthday. 1969 ISBN 90-277-0085-0 P. V. Tavanec (ed.), Problems of the Logic ofScientific Knowledge. Translated from Russian. 1970 ISBN 90-277-0087-7 M. Swain (ed.), Induction , Acceptance. and Rational Belief 1970 ISBN 90-277-0086-9 R. S. Cohen and R. J. Seeger (eds.), Ernst Mach: Physicist and Philosopher. [Boston Studies in the Philosophy of Science. Vol. VI]. 1970 ISBN 90-277-0016-8 J. Hintikka and P. Suppes, Information and Inference. 1970 ISBN 90-277-0155-5 K. Lambert, Philosophical Problems in Logic. Some Recent Developments. 1970 ISBN 90-277-0079-6 R. A. Eberle, Nominalistic Systems. 1970 ISBN 90-277-0161-X P. Weingartner and G. Zecha (eds.), Induction , Physics. and Ethics. 1970 ISBN 90-277-0158-X ISBN 90-277 -0173-3 E. W. Beth, Aspects of Modern Logic. Translated from Dutch. 1970 R. Hilpinen (ed.), Deontic Logic. Introductory and Systematic Readings . 1971 See also No. 152. ISBN Pb (1981 rev.) 90-277-1302-2 J.-L. Krivine, Introduction to Axiomatic Set Theory. Translated from French . 1971 ISBN 90-277-0169-5; Pb 90-277-0411 -2 J. D. Sneed, The Logical Structure of Mathematical Physics. 2nd rev. ed., 1979 ISBN 90-277-1056-2; Pb 90-277-1059-7 C. R. Kordig, The Justification ofScientific Change. 1971 ISBN 90-277-0181-4; Pb 90-277-0475-9 M. Capek, Bergson and Modern Physics. A Reinterpretation and Re-evaluation. [Boston Studies in the Philosophy of Science, Vol. VII] 1971 ISBN 90-277-0186-5 N. R. Hanson, What I Do Not Believe, and Other Essays . Ed. by S. Toulmin and H. Woolf. 1971 ISBN 90-277-0191-1 R. C. Buck and R. S. Cohen (eds.), PSA 1970. Proceedings of the Second Biennial Meeting of the Philosophy of Science Association, Boston, Fall 1970. In Memory of Rudolf Camap. [Boston Studies in the Philosophy of Science, Vol. VIII] 1971 ISBN 90-277-0187-3; Pb 90-277-0309-4 D. Davidson and G. Harman (eds.), Semantics of Natural Language. 1972 ISBN 90-277-0304-3; Pb 90-277-0310-8 Y. Bar-Hillel (ed.), Pragmatics ofNatural Languages. 1971 ISBN 90-277-0194-6; Pb 90-277-0599-2 ISBN 90-277-0305-1 S. Stenlund, Combinators, 1 Terms and Proof Theory. 1972 M. Strauss, Modern Physics and Its Philosophy. Selected Paper in the Logic, History, and Philosophy of Science . 1972 ISBN 90-277-0230-6 M. Bunge, Method, Model and Matter. 1973 ISBN 90-277-0252-7 ISBN 90-277 -0253-5 M. Bunge, Philosophy of Physics. 1973 A. A. Zinov 'ev, Foundations ofthe Logical Theory ofScientific Knowledge (Complex Logic). Revised and enlarged English edition with an appendix by G. A. Smirnov, E. A. Sidorenka, A. M. Fedina and L. A. Bobrova. [Boston Studies in the Philosophy of Science , Vol. IX] 1973 ISBN 90-277 -0193-8 ; Pb 90-277 -0324-8 L. Tondl, Scientific Procedures. A Contribution concerning the Methodological Problems of Scientific Concepts and Scientific Explanation. Translated from Czech by D. Short . Edited by R.S. Cohen and M.W. Wartofsky. [Boston Studies in the Philosophy of Science, Vol. X] 1973 ISBN 90-277-0147-4; Pb 90-277-0323-X N. R. Hanson, Constellations and Conjectures. 1973 ISBN 90-277-0192-X
SYNTHESE LIBRARY 49. 50. 51. 52. 53. 54.
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K. J. J. Hintikka , J. M. E. Moravcsik and P. Suppes (eds.), Approaches to Natural Language . 1973 ISBN 90-277-0220-9; Pb 90-277-0233-0 ISBN 90-277-0251-9 M. Bunge (ed.), Exact Philosophy. Problems, Tools and Goals . 1973 R. J. Bogdan and I. Niiniluoto (eds.), Logic, Language and Probability. 1973 ISBN 90-277-0312-4 G. Pearce and P. Maynard (eds.), Conceptual Change. 1973 ISBN 90-277-0287-X; Pb 90-277-0339-6 I. Niiniluoto and R. Tuomela, Theoretical Concepts and Hypothetico-inductive Inference. 1973 ISBN 90-277-0343-4 R. Fraisse, Course of Mathematical Logic - Volume I: Relation and Logical Formula. Translated from French . 1973 ISBN 90-277-0268-3 ; Pb 90-277-0403-1 (For Volume 2 see under No. 69). A. Grunbaum, Philosophical Problems of Space and Time. Edited by R.S. Cohen and M.W. Wartofsky. 2nd enlarged ed. [Boston Studies in the Philosophy of Science, Vol. XII] 1973 ISBN 90-277-0357-4; Pb 90-277-0358-2 P. Suppes (ed.), Space, Time and Geometry. 1973 ISBN 90-277-0386-8; Pb 90-277-0442-2 H. Kelsen, Essays in Legal and Moral Philosophy. Selected and introduced by O. Weinberger. Translated from German by P. Heath. 1973 ISBN 90-277-0388-4 R. J. Seeger and R. S. Cohen (eds.), Philosophical Foundations of Science. [Boston Studies in the Philosophy of Science, Vol. XI] 1974 ISBN 90-277-0390-6; Pb 90-277-0376-0 R. S. Cohen and M. W. Wartofsky (eds.), Logical and Epistemological Studies in Contemporary Physics . [Boston Studies in the Philosophy of Science, Vol. XIII] 1973 ISBN 90-277-0391-4; Pb 90-277-0377-9 R. S. Cohen and M. W. Wartofsky (eds.), Methodological and Historical Essays in the Natural and Social Sciences. Proceedings of the Boston Colloquium for the Philosophy of Science, 1969-1972. [Boston Studies in the Philosophy of Science, Vol. XIV] 1974 ISBN 90-277-0392-2; Pb 90-277-0378-7 R. S. Cohen, J. J. Stachel and M. W. Wartofsky (eds.), For Dirk Struik. Scientific , Historical and Political Essays . [Boston Studies in the Philosophy of Science , Vol. XV] 1974 ISBN 90-277-0393-0; Pb 90-277-0379-5 K. Ajdukiewicz, Pragmatic Logic . Translated from Polish by O. Wojtasiewicz . 1974 ISBN 90-277-0326-4 S. Stenlund (ed.), Logical Theory and Semantic Analysis. Essays dedicated to Stig Kanger on His 50th Birthday. 1974 ISBN 90-277-0438-4 K. F. Schaffner and R. S. Cohen (eds.), PSA 1972. Proceedings ofthe Third Biennial Meeting of the Philosophy ofScience Association. [Boston Studies in the Philosophy of Science, Vol. XX] 1974 ISBN 90-277 -0408-2; Pb 90-277-0409-0 H. E. Kyburg, Jr., The Logical Foundations ofStatistical Inference . 1974 ISBN 90-277-0330-2; Pb 90-277-0430-9 M. Grene, The Understanding ofNature. Essays in the Philosophy of Biology. [Boston Studies in the Philosophy of Science, Vol. XXIII) 1974 ISBN 90-277 -0462-7 ; Pb 90-277-0463-5 J. M. Brockman, Structuralism : Moscow, Prague, Paris. Translated from German . 1974 ISBN 90-277-0478-3 N. Geschwind, Selected Papers on Language and the Brain. [Boston Studies in the Philosophy of Science , Vol. XVI] 1974 ISBN 90-277-0262-4; Pb 90-277-0263-2 R. Fraisse, Course ofMathematical Logic- Volume 2: Model Theory. Translated from French. 1974 ISBN 90-277-0269-1 ; Pb 90-277-0510-0 (For Volume 1 see under No. 54)
SYNTHESE LIBRARY 70. 71. 72. 73. 74.
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80. 81. 82. 83. 84. 85. 86. 87. 88. 89.
A. Grzegorczyk, An Outline ofMathematical Logic. Fundamental Results and Notions explained with all Details. Translated from Polish. 1974 ISBN 90-277-0359-0; Pb 90-277-0447-3 F. von Kutschera, Philosophy of Language. 1975 ISBN 90-277-0591-7 J. Manninen and R. Tuomela (eds.), Essays on Explanation and Understanding . Studies in the Foundations of Humanities and Social Sciences. 1976 ISBN 90-277-0592-5 J. Hintikka (ed.), RudolfCarnap, Logical Empiricist. Materials and Perspectives. 1975 ISBN 90-277-0583-6 M. Capek (ed.) , The Concepts of Space and Time. Their Structure and Their Development. [Boston Studies in the Philosophy of Science, Vol. XXII] 1976 ISBN 90-277-0355-8; Pb 90-277-0375-2 J. Hintikka and U. Remes, The Method of Analysis. Its Geometrical Origin and Its General Significance. [Boston Studies in the Philosophy of Science, Vol. XXV] 1974 ISBN 90-277-0532-1 ; Pb 90-277-0543-7 J. E. Murdoch and E. D. Sylla (eds.), The Cultural Context of Medieval Learning . [Boston Studies in the Philosophy of Science, Vol. XXVI] 1975 ISBN 90-277-0560-7; Pb 90-277-0587-9 S. Amsterdamski, Between Experience and Metaphysics. Philosophical Problems of the Evolution of Science. [Boston Studies in the Philosophy of Science, Vol. XXXV] 1975 ISBN 90-277-0568-2; Pb 90-277-0580-1 P. Suppes (ed.), Logic and Probability in Quantum Mechanics. 1976 ISBN 90-277-0570-4; Ph 90-277-1200-X H. von Helmholtz: Epistemological Writings. The Paul Hertz / Moritz Schlick Centenary Edition of 1921 with Notes and Commentary by the Editors. Newly translated from German by M. F. Lowe. Edited, with an Introduction and Bibliography, by R. S. Cohen and Y. Elkana. [Boston Studies in the Philosophy of Science, Vol. XXXVII] 1975 ISBN 90-277 -0290-X; Pb 90-277-0582-8 J. Agassi, Science in Flux. [Boston Studies in the Philosophy of Science, Vol. XXVIII] 1975 ISBN 90-277-0584-4; Pb 90-277-0612-2 S. G. Harding (ed.), Can Theories Be Refuted? Essays on the Duhern-Quine Thesis. 1976 ISBN 90-277-0629-8; Pb 90-277-0630-1 S. Nowak, Methodology ofSociological Research. General Problems. 1977 ISBN 90-277 -0486-4 J. Piaget , I .-B. Grize, A. Szerninsska and V. Bang, Epistemology and Psychology ofFunctions. Translated from French. 1977 ISBN 90-277-0804-5 M. Grene and E. Mendelsohn (eds.), Topics in the Philosophy of Biology. [Boston Studies in the Philosophy of Science, Vol. XXVII] 1976 ISBN 90-277-0595-X; Ph 90-277-0596-8 E. Fischbein, The lntuitive Sources of Probabilistic Thinking in Children. 1975 ISBN 90-277-0626-3 ; Pb 90-277-1190-9 E. W. Adams , The Logic of Conditionals. An Application of Probability to Deductive Logic . 1975 ISBN 90-277-0631-X M. Przelecki and R. Wojcicki (eds .), Twenty-Five Years of Logical Methodology in Poland. Translated from Polish . 1976 ISBN 90-277-0601-8 I. Topolski, The Methodology of History. Translated from Polish by O. Wojtasiewicz. 1976 ISBN 90-277-0550-X A. Kasher (ed .), Language in Focus: Foundations, Methods and Systems . Essays dedicated to Yehoshua Bar-Hillel. [Boston Studies in the Philosophy of Science, Vol. XLIII] 1976 ISBN 90-277-0644-1 ; Ph 90-277-0645-X
SYNTHESE LIBR ARY 90. 91. 92. 93. 94. 95. 96.
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108. 109. 110. II I. 112. 113. 114.
J. Hintikka, The Intentions of Intentional ity and Other New Models fo r Modalities. 1975 ISBN 90-277-0633-6; Pb 90-277-0634-4 W. Stegmul ler, Collected Papers on Episte mology, Philosophy of Science and lJistory of Set ISB N 90-277-0767-7 Philosophy. 2 Volume s. 1977 D. M. Gabbay, Investigations in Modal and Tense Logics with Applications to Problems in ISBN 90-277-0656-5 Philosophy and Linguistics. 1976 R.1. Bogdan, Local Induction. 1976 ISBN 90-277-0649-2 S. Nowak, Understanding and Prediction. Essays in the Methodology of Social and Behavioral Theories. 1976 ISBN 90-277-0558-5; Pb 90-277-1199-2 P. Mittelstaedt, Philosophical Problems of Modem Physics. [Boston Studies in the Philosophy of Science , Vol. XVlII] 1976 ISBN 90-277-0285-3 ; Pb 90-277-0506-2 G. Holton and W. A. Blanpied (eds.), Science and Its Public: The Changing Relation ship. [Boston Stud ies in the Philosophy of Science , Vol. XXXIIl] 1976 ISBN 90-277 -0657-3; Pb 90-277-0658-1 M. Brand and D. Walton (eds.), Action Theory. 1976 ISBN 90-277-0671-9 P. Gochet, Outline ofa Nominalist Theory ofPropositions. An Essay in the Theory of Meaning and in the Philo sophy of Logic. 1980 ISBN 90-277-1031-7 R. S. Cohen , P. K. Feyerabend , and M. W. Wartofsky (eds.), Essays in Memory of lmre Lakatos . [Boston Studies in the Philosophy of Science , Vol. XXXIX] 1976 ISBN 90-277-0654-9; Pb 90-277-0655-7 R. S. Cohen and J. J. Staehel (eds.), Selected Papers of Leon Rosenfield. [Boston Stud ies in the Philosophy of Science, Vol. XXI] 1979 ISBN 90-277 -0651-4; Pb 90-277-0652-2 R. S. Cohen, C. A. Hooker, A. C. Michalos and J. W. van Evra (eds.) , PSA 1974. Proceedings of the 1974 Biennial Meet ing of the Philosophy ofScience Association. [Boston Studies in the Philosophy of Science, Vol. XXXlI] 1976 ISBN 90-277-0647-6; Pb 90-277-0648-4 y. Fried and 1. Agas si, Paranoia. A Study in Diagno sis. [Boston Studies in the Philosophy of Science, Vol. L] 1976 ISBN 90-277-0704-9; Pb 90-277-0705-7 M. Przelecki, K. Szaniawski and R. Wojcicki (eds.), Formal Methods in the Methodolog y of Empirical Sciences. 1976 ISBN 90-277-0698-0 J. M. Vickers, Beliefand Probability. 1976 ISBN 90-277-0744-8 K. H. Wolff, Surrender and Catch. Experience and Inquiry Today. [Boston Studies in the Philosophy of Science , Vol. Lt] 1976 ISBN 90-277-0758-8; Pb 90-277-0765-0 K. Kosik, Dialectics ofthe Concrete. A Study on Problems of Man and World. [Boston Studies in the Philosophy of Science, Vol. LlI] 1976 ISBN 90-277-0761-8; Pb 90-277-0764-2 N. Goodman, The Structure of Appearance. 3rd ed. with an Introduction by G . Hellman. [Boston Studies in the Philo sophy of Science , Vol. LIIl] 1977 ISBN 90-277-0773-1 ; Pb 90-277-0774-X K. Ajdukiewicz, The Scientific World-Perspective and Other Essays, 193/ -1963. Translated from Polish. Edited and with an Introduction by J. Giedymin . 1978 ISBN 90-277-0527-5 R. L. Cau sey, Unity of Science. 1977 ISB N 90-277 -0779-0 R. E. Grandy, Advanced Logic fo r Applications. 1977 ISBN 90-277-0781-2 R. P. McArthur, Tense Logic. 1976 ISBN 90-277-0697-2 L. Lindahl , Position and Change. A Study in Law and Logic. Translated from Sw edish by P. Needham. 1977 ISBN 90-277-0787-1 R. Tuomela, Dispositions. 1978 ISB N 90-277-08 10-X H. A. Simon, Models ofDiscovery and Other Topics in ihe Methods of Science. [Boston Stud ies in the Philosophy of Science, Vol. LtV] 1977 ISBN 90-277-08 12-6; Pb 90-277-0858-4
SYNTHESE LIBRARY 115. R. D. Rosenkrantz, Inference, Method and Decision. Towards a Bayesian Philosophy of Science . 1977 ISBN 90-277-0817-7 ; Pb 90-277-0818-5 116. R. Tuomela, Human Action and Its Explanation. A Study on the Philosophical Foundations of Psycholog y. 1977 ISBN 90-277-0824-X 117. M. Lazerowitz, The Language of Philosoph y. Freud and Wittgenstein. [Boston Studies in the Philosophy of Science , Vol. LVjI977 ISBN 90-277-0826-6; Pb 90-277-0862-2 118. Not published 119. J. Pelc (ed.), Semiotics in Poland, 1894-1969. Translated from Polish . 1979 ISBN 90-277 -0811-8 120. I. Porn, Action Theory and Social Science. Some Formal Models . 1977 ISBN 90-277-0846-0 121. J. Margolis, Persons and Mind . The Prospects of Nonreductive Materialism. [Boston Studies in the Philosophy of Science, Vol. LVIIj 1977 ISBN 90-277 -0854-1; Pb 90-277-0863-0 122. J. Hintikka, I. Niiniluoto, and E. Saarinen (eds.), Essays on Mathematical and Philosophical Logic. 1979 ISBN 90-277-0879-7 123. T. A. F. Kuipers, Studies in Inductive Probability and Rational Expectation . 1978 ISBN 90-277-0882-7 124. E. Saarinen, R. Hilpinen , I. Niiniluoto and M. P. Hintikka (eds.), Essays in Honour of Jaakko ISBN 90-277-0916-5 Hintikka on the Occasion of His 50th Birthday. 1979 125. G. Radnitzky and G. Andersson (eds.), Progress and Rationality in Science. [Boston Studies in the Philosophy of Science, Vol. LVIII] 1978 ISBN 90-277-0921-1; Pb 9Q-277-0922-X 126. P. Mittelstaedt, Quantum Logic. 1978 ISBN 90-277-0925-4 127. K. A. Bowen, Model Theory for Modal Logic. Kripke Models for Modal Predicate Calculi . 1979 ISBN 90-277-0929-7 128. H. A. Bursen, Dismantling the Memory Machine. A Philosophical Investigation of Machine Theories of Memory. 1978 ISBN 90-277-0933-5 129. M. W. Wartofsky, Models . Representation and the Scientific Understanding. [Boston Studies ISBN 90-277-0736-7; Pb 90-277-0947-5 in the Philosophy of Science , Vol. XLVIII] 1979 130. D. Ihde, Technics and Praxis. A Philosophy of Technology. [Boston Studies in the Philosophy ISBN 90-277-0953-X; Pb 90-277-0954-8 of Science , Vol. XXIVj1979 131. J. J. Wiatr (ed.), Polish Essays in the Methodology of the Social Sciences. [Boston Studies in the Philosophy of Science , Vol. XXIX] 1979 ISBN 90-277-0723-5; Pb 90-277-0956-4 ISBN 90-277-0958-0 132. W. C. Salmon (ed.), Hans Reichenbach: Logical Empiricist . 1979 133. P. Bieri, R.-P. Horstmann and L. Kruger (eds.), Transcendental Arguments in Science . Essays in Epistemology. 1979 ISBN 90-277-0963-7; Pb 90-277-0964-5 134. M. Markovic and G. Petrovic (eds.), Praxis. Yugoslav Essays in the Philosophy and Methodology of the Social Sciences. [Boston Studies in the Philosophy of Science, Vol. XXXVI] 1979 ISBN 90-277 -0727-8 ; Pb 9Q-277-0968-8 135. R. Wojcicki, Topics in the Formal Methodology ofEmpirical Sciences . Translated from Polish. 1979 ISBN 90-277-1004-X 136. G. Radnitzky and G. Andersson (eds.), The Structure and Development of Science . [Boston Studies in the Philosophy of Science, Vol. LIXj1979 ISBN 90-277-0994-7; Pb 90-277-0995-5 137. J. C. Webb, Mechanism , Mentalism and Metamathematics . An Essay on Finitism. 1980 ISBN 90-277-1046-5 138. D. F. Gustafson and B. L. Tapscott (eds.), Body, Mind and Method. Essays in Honor of Virgil C. Aldrich . 1979 ISBN 90-277-1013-9 139. L. Nowak, The Structure of Idealization . Towards a Systematic Interpretation of the Marxian Idea of Science. 1980 ISBN 90-277-1014-7
SYNTHESE LIBRARY 140. C. Perelman, The New Rhetoric and the Humanities. Ess ays on Rhetoric and Its Applications. Translated from French and Germ an. With an Introduction by H. Zyskind . 1979 IS BN 90-277 - 1018-X; Pb 90-277-1019-8 141. W. Rabinowicz, Universalizability. A Study in Moral s and Metaph ysic s. 1979 ISBN 90-277 -1020- 2 142. C. Perelm an, Justice, Law and Argument. Essay s on Moral and Legal Reasoning. Tran slated from French and Germ an. With an Introduction by H.J . Berm an. 1980 IS BN 90-277-1089 -9 ; Pb 90-277-1090-2 143. S. Kanger and S. Ohman (cds.), Philosophy and Grammar. Paper s on the Occas ion of the Quincentennial of Uppsala Univer sity. 198 1 IS BN 90-277-109 1-0 144 . T. Pawlowski, Concept Formatio n in the Humanities and the Social Sciences. 1980 ISBN 90-277-1096-1 145. J. Hint ikka, D. Grucndcr and E. Agazzi (eds.), Theory Change, Ancient Axiomatics and Galileo 's Methodology. Proceedings ofthe 1978 Pisa Conference on the History and Phi losophy of Sci ence, Volume I. 1981 ISBN 90-277-11 26-7 146. J . Hin tikka, D. Gru ender and E. Agazzi (eds.), Probabilistic Thinking, Thermodynami cs, and the Interaction of the History and Philosophy of Science. Proceedings of the 1978 Pisa Conference on the History and Philosophy of Science, Volume II. 1981 ISBN 90-277-112 7-5 147. U. Monnich (ed.), Aspects of Philosophical Logic. Some Logical Foray s into Cen tral Notions of Lingui stics and Philosophy. 198 1 ISB N 90-2 77- 1201-8 148. D. M. Gabbay, Semantical lnvestigations in Heyting 's lntuitionistic Logic. 1981 ISB N 90-277- 1202-6 149. E. Agazzi (ed.), Modem Logic - A Survey. Historical, Philosophical, and Mathematical Aspects of Modern Logic and Its Applications. 198 1 IS BN 90-277 -1137-2 150. A. F. Parker- Rhode s, The Theory of lndistinguishables. A Search for Expl anatory Principles ISB N 90-277- 1214-X below the Level of Physics. 198 1 151. J. C. Pitt, Pictures, Images, and Conceptual Change. An Analy sis of Wilfrid Sellars' Philosophy of Science. 1981 IS BN 90-277- 1276-X ; Pb 90-277-1277-8 152. R. Hilp inen (ed.), New Studies in Deontic Logic. Norms, Actions, and the Foundations of Ethics. 198 1 ISBN 90-277- 1278-6; Pb 90-277-1346-4 153. C. Dilworth, Scientific Progress . A Study Concerning the Nature of the Relation between Successive Scientific Theories. 3rd rev. ed ., 1994 ISBN 0-7923 -2487-0 ; Pb 0-7923-2488-9 154. D. Woodruff Smith and R. Mcl ntyre, Husserl and Intentionality. A Study of Mind, Meani ng, and Language. 1982 ISBN 90-277- 1392-8; Pb 90-277- 1730-3 155. R. J. Nelson, The Logic of Mind. 2nd. ed ., 1989 ISBN 90-277-28 19-4; Pb 90-277-2822-4 156. J. F. A. K. van Benthem, The Logic of TIme. A Model-Theoretic Investigation into the Varieties of Temporal Ontology, and Temporal Discourse. 1983; 2nd ed. , 1991 ISBN 0-7923 -1081-0 157. R. Swinburne (ed.), Space, TIme and Causality. 1983 ISBN 90-277-1437-1 158. E. T. Jaynes, Papers on Probability, Statistics and Statistical Physics. Ed. by R. D. Rozenkrantz. 1983 ISBN 90-277-1448-7 ; Pb (1989 ) 0-7923 -0213-3 159. T. Chapman, TIme: A Philosophical Analysis. 1982 ISBN 90-277 -1465-7 160. E. N. Zalta , Abstract Objects. An Introduction to Axiomatic Metaphysics. 1983 ISBN 90-277-1474-6 161. S. Hard ing and M. B. Hintikka (cds.), Discovering Reality. Femin ist Perspectives on Epist emology, Metaphysics, Methodology, and Philosophy of Science. 1983 ISBN 90-277-1496-7 ; Pb 90-277- 1538-6 162. M. A. Stewart (ed.). U1W, Moralit y and Rights. 1983 ISBN 90-277 -1519 -X
SYNTHESE LIBRARY 163. D. Mayr and G. Siissmann (eds.), Space, TIme, and Mechanics. Basic Structures of a Physical Theory. 1983 ISBN 90-277-1525-4 164. D. Gabbay and F. Guenthner (eds.), Handbook of Philosophical Logic. Vol. I: Elements of Classical Logic. 1983 ISBN 90-277-1542-4 165. D. Gabbay and F. Guenthner (eds.), Handbook of Philosophical Logic. Vol. II: Extensions of Classical Logic. 1984 ISBN 90-277-1604-8 166. D. Gabbay and F. Guenthner (eds.), Handbook ofPhilosophi cal Logic. Vol. III: Alternative to Classical Logic. 1986 ISBN 90-277-1605-6 167. D. Gabbay and F. Guenthner (eds.), Handbook of Philosophical Logic. Vol. IV: Topics in the Philosophy of Language. 1989 ISBN 90-277-1606-4 168. A. J. I. Jones, Communication and Meaning . An Essay in Applied Modal Logic. 1983 ISBN 90-277-1543-2 169. M. Fitting, Proof Methods f or Modal and Intuit ionistic Logics. 1983 ISBN 90-277-1573-4 170. J. Margolis, Culture and Cultural Entities. Toward a New Unity of Science. 1984 ISBN 90-277-1574-2 171. R. Tuornela, A Theo ry ofSocial Action. 1984 ISBN 90-277-1703-6 172. J. J. E. Gracia, E. Rabossi, E. Villanueva and M. Dascal (eds.), Philosophical Analysis in Latin America. 1984 ISBN 90-277-1749-4 173. P. Ziff, Epistem ic Analysis. A Coherence Theory of Knowledge. 1984 ISBN 90-277-1751-7 174. P. Ziff, Antiaesthetics. An Appreciation of the Cow with the Subtile Nose. 1984 ISBN 90-277-1773-7 175. W. Balzer, D. A. Pearce, and H.-J. Schmidt (eds.), Reduction in Science. Structure, Examples, Philosophical Problems. 1984 ISBN 90-277-1811-3 176. A. Peczenik, L. Lindahl and B. van Roermund (eds.), Theory ofLegal Science. Proceedings of the Conference on Legal Theory and Philosophy of Science (Lund, Sweden, December 1983). 1984 ISBN 90-277-1834-2 177. I. Niiniluoto, Is Science Progressive ? 1984 ISBN 90-277-1835-0 178. B. K. Matilal and J. L. Shaw (eds.), Analytical Philosophy in Comparative Perspective. Exploratory Essays in Current Theories and Classical Indian Theories of Meaning and Reference. 1985 ISBN 90-277-1870-9 179. P. Kroes, TIme: Its Structure and Role in Physical Theories. 1985 ISBN 90-277-1894-6 180. J. H. Fetzer, Sociobiology and Epistemology. 1985 ISBN 90-277-2005-3; Pb 90-277-2006-1 181. L. Haaparanta and J. Hintikka (eds.), Frege Synthesized. Essays on the Philosophical and Foundational Work of Gottlob Frege. 1986 ISBN 90-277-2126-2 182. M. Detlefsen, Hilbert's Program. An Essay on Mathematical Instrumentalism. 1986 ISBN 90-277-2151-3 183. J. L. Golden and J. J. Pilotta (eds.), Practi cal Reasoning in Human Affairs. Studies in Honor ofChaim Perelman. 1986 ISBN 90-277-2255-2 184. H. Zandvoort, Mod els ofScientific Developm ent and the Case of Nucl ear Magnetic Resonance. 1986 ISBN 90-277-2351-6 ISBN 90-277-2354-0 185. I. Niiniluoto, Truthliken ess . 1987 186. W. Balzer, C. U. Moulines and J. D. Sneed, An Architectonic fo r Science. The Structuralist Program. 1987 ISBN 90-277-2403-2 187. D. Pearce, Roads to Commensurability. 1987 ISBN 90-277-2414-8 188. L. M. Vaina (ed.), Matte rs of Intelligence. Conceptual Structures in Cognitive Neuroscience. 1987 ISBN 90-277-2460-1
SYNTHESE LIBRARY 189. H. Siegel, Relativism Refu ted. A Critique of Contemporary Epistemological Relativism. 1987 ISBN 90-277-2469-5 190. W CalJebaut and R. Pinxten, Evolutionary Epistemology. A Multiparadigm Program, with a Complete Evolutionary Epistemology Bibliograph. 1987 ISBN 90-277-2582-9 ISBN 90-277-2199-8 191. J. Kmita, Problems in Historical Epistemology. 1988 192. J. H. Fetzer (ed.), Probability and Causality. Essays in Honor of Wesley C. Salmon, with an Annotated Bibliography. 1988 ISBN 90-277-2607-8; Pb 1-5560-8052-2 193. A. Donovan, L. Laudan and R. Laudan (eds.), Scrutinizing Science. Empirical Studies of Scientific Change. 1988 ISBN 90-277-2608-6 ISBN 90-277-2640-X 194. H.R. Otto and J.A. Tuedio (eds.), Perspectives on Mind. 1988 195. D. Batens and J.P. van Bendegem (eds.), Theory and Experiment. Recent Insights and New Perspectives on Their Relation. 1988 ISBN 90-277-2645-0 ISBN 90-277-2648-5 196. J. Osterberg, Self and Others. A Study of Ethical Egoism. 1988 197. D.H. Helman (ed.), Anal ogical Reasoning. Perspectives of Artificial Intelligence, Cognitive Science, and Philosophy. 1988 ISBN 90-277-2711-2 198. J. Wolenski, Logic and Philosophy in the Lvov-Warsaw School. 1989 ISBN 90-277-2749-X 199. R. Wojcicki, Theory of Logical Calculi. Basic Theory of Consequence Operations. 1988 ISBN 90-277-2785-6 200. J. Hintikka and M.B. Hintikka, The Logic of Epistemology and the Epistemology of Logic. Selected Essays. 1989 ISBN 0-7923-0040-8; Pb 0-7923-0041-6 ISBN 90-277-2808-9 201. E. Agazzi (ed.), Probabili ty in the Sciences. 1988 ISBN 90-277-2814-3 202. M. Meyer (ed.), From Metaphysics to Rhetoric. 1989 203. R.L. Tieszen, Mathematical lntuition, Phenomenology and Mathematical Knowledge. 1989 ISBN 0-7923-0131-5 ISBN 0-7923-0135-8 204. A. Melnick, Space. TIme, and Thought in Kant. 1989 205. D.W Smith, The Circle ofAcquaintance. Perception, Consciousness, and Empathy. 1989 ISBN 0-7923-0252-4 206. M.H. Salmon (ed.), The Philosophy of Logical Mechanism. Essays in Honor of Arthur W Burks. With his Responses, and with a Bibliography of Burk's Work. 1990 ISBN 0-7923-0325-3 207. M. Kusch, Language as Calculus vs. Language as Universal Medium. A Study in Husser!, Heidegger, and Gadamer. 1989 ISBN 0-7923-0333-4 208. T.C. Meyering, Historical Roots of Cognitive Science . The Rise of a Cognitive Theory of Perception from Antiquity to the Nineteenth Century. 1989 ISBN 0-7923-0349-0 ISBN 0-7923-0389-X 209. P. Kosso, Observabilit y and Observation in Physical Science. 1989 ISBN 0-7923-0441-1 210. J. Kmita, Essays on the Theory of Scientific Cognition. 1990 211. W Sieg (ed.), Acting and Reflecting. The Interdisciplinary Tum in Philosophy. 1990 ISBN 0-7923-0512-4 ISBN 0-7923-0546-9 212. J. Karpinski, Causality in Sociological Research. 1990 ISBN 0-7923-0823-9 213. H.A. Lewis (ed.), Peter Geach: Philosophical Encounters. 1991 214. M. Ter Hark, Beyond the Inner and the Outer. Wittgenstein's Philosophy of Psychology. 1990 ISBN 0-7923-0850-6 215. M. Gosselin, Nominalism and Contempo rary Nominalism. Ontological and Epistemological Implications of the Work ofW V.O. Quine and of N. Goodman. 1990 ISBN 0-7923-0904-9 216. J.H. Fetzer, D. Shatz and G. Schlesinger (eds.), Definitions and Definabil ity. Philosophical Perspectives. 1991 ISBN 0-7923-1046-2 217. E. Agazzi and A. Cordero (eds.), Philosophy and the Origin and Evolution of the Universe. 1991 ISBN 0-7923-1322-4
SYNTHESE LIBRARY 218. M. Kusch, Foucault 's Strata and Fields. An Investigationinto Archaeological and Genealogical Science Studies. 1991 ISBN 0-7923-1462-X 219. C.1. Posy, Kant 's Philosophy of Mathematics. Modem Essays. 1992 ISBN 0-7923-1495-6 220. G. Van de Vijver, New Perspectives on Cybernetics. Self-Organization, Autonomy and Connectionism.1992 ISBN 0-7923-1519-7 ISBN 0-7923-1566-9 221. 1.C. Nyfri, Tradition and Individuality . Essays. 1992 222. R. Howell, Kant's Transcendental Deduction . An Analysis of Main Themes in His Critical Philosophy. 1992 ISBN 0-7923-1571-5 223. A. Garcia de la Sienra, The Logical Foundations of the Marxian Theory of Value. 1992 ISBN 0-7923-1778-5 224. D.S. Shwayder, Statement and Referent. An Inquiry into the Foundations of Our Conceptual Order. 1992 ISBN 0-7923-1803-X 225. M. Rosen, Problems of the Hegelian Dialectic. Dialectic Reconstructed as a Logic of Human Reality. 1993 ISBN 0-7923-2047-6 226. P. Suppes, Models and Methods in the Philosoph y ofScience : Selected Essays . 1993 ISBN 0-7923-2211-8 227. R. M. Dancy (ed.), Kant and Critique : New Essays in Honor ofW. H. Werkmeister. 1993 ISBN 0-7923-2244-4 228. 1. Woleriski (ed.), Philosophical Logic in Poland. 1993 ISBN 0-7923-2293-2 229. M. De Rijke (ed.), Diamonds and Defaults. Studies in Pure and Applied Intensional Logic. 1993 ISBN 0-7923-2342-4 230. B.K. Matilal andA . Chakrabarti (eds.), Knowing from Words. Westernand Indian Philosophical Analysis of Understanding and Testimony. 1994 ISBN 0-7923-2345-9 231. S.A. Kleiner, The Logic ofDiscovery. A Theory of the Rationality of Scientific Research. 1993 ISBN 0-7923-2371-8 232. R. Festa, Optimum Inductive Methods . A Study in Inductive Probability, Bayesian Statistics, and Verisimilitude. 1993 ISBN 0-7923-2460-9 233. P. Humphreys(ed.), Patrick Suppes: Scientific Philosopher. Vol. 1:Probability and Probabilistic Causality. 1994 ISBN 0-7923-2552-4 234. P. Humphreys (ed.), Patrick Suppes : Scientific Philosopher. Vol. 2: Philosophy of Physics, Theory Structure, and Measurement Theory. 1994 ISBN 0-7923-2553-2 235. P. Humphreys (ed.), Patrick Suppes: Scientific Philosopher. Vol. 3: Language, Logic, and Psychology. 1994 ISBN 0-7923-2862-0 Set ISBN (Vols 233-235) 0-7923-2554-0 236. D. Prawitz and D. Westerstahl (eds.), Logic and Philosophy of Science in Uppsala. Papers from the 9th International Congress of Logic, Methodology, and Philosophy of Science. 1994 ISBN 0-7923-2702-0 237. L. Haaparanta (ed.), Mind, Meaning and Mathematics. Essays on the Philosophical Views of Husserl and Frege. 1994 ISBN 0-7923-2703-9 238. 1. Hintikka (ed.), Aspects ofMetaphor. 1994 ISBN 0-7923-2786-1 239. B. McGuinness and G. Oliveri (eds.), The Philosophy ofMichael Dummett . With Replies from Michael Dummett. 1994 ISBN 0-7923-2804-3 240. D. lam ieson (ed.), Language, Mind, and Art. Essays in Appreciation and Analysis, In Honor of Paul Ziff. 1994 ISBN 0-7923-2810-8 241. G. Preyer, F. Siebelt and A. Ulfig (eds.), Language, Mind and Epistemology . On Donald Davidson's Philosophy. 1994 ISBN 0-7923-2811-6 242. P. Ehrlich (ed.), Real Number s, Generalizations ofthe Reals, and Theories of Continua. 1994 ISBN 0-7923-2689-X
SYNTHESE LIBRARY 243 . G. Debrock and M. Hulswit (eds.), Living Doubt . Essays concerning the epistemology of Charl es Sanders Peirce. 1994 ISBN 0-7923-2898-1 244 . 1. Srzednicki , To Know or Not to Know. Beyond Realism and Anti-Realism. 1994 ISBN 0-7923-2909-0 245 . R. Egid i (ed.), Wittgenstein: Mind and Language. 1995 ISBN 0-7923-3171-0 246. A. Hyslop, Other Minds . 1995 ISBN 0-7923-3245-8 247 . L. P610s and M. Masuch (eds.), Applied Logic: How, What and Why. Logical Approaches to Natural Language . 1995 ISBN 0-7923-3432-9 248 . M. Krynicki, M. Mostowski and L.M . Szczerba (cds.), Quantifiers: Logics, Models and Computation. Volume One : Surveys . 1995 ISBN 0-7923-3448-5 249. M. Krynicki , M. Mostowski and L.M . Szczerba (eds.), Quantifiers: Logics, Models and ComISBN 0-7923-3449-3 putation. Volume Two: Contributions. 1995 Set ISBN (Vols 248 + 249) 0-7923-3450-7 250. R.A. Watson, Representational Ideas from Plato to Patricia Churchland. 1995 ISBN 0-7923 -3453 -1 251. 1. Hintikka (ed.) , From Dedekind to Godel . Essays on the Development of the Foundations of Mathematics. 1995 ISBN 0-7923-3484-1 252. A. Wisniewski, The Posing ofQuestions. Logical Foundations of Erotetic Inferences. 1995 ISBN 0-7923-3637-2 253. J. Peregrin, Doing Worlds with Words. Formal Semantics without Formal Metaphysics. 1995 ISBN 0-7923-3742-5 254 . LA. Kieseppa, Truthlikeness for Multidimensional, Quantitative Cognitive Problems. 1996 ISBN 0-7923-4005-1 255. P. Hugly and C. Sayward: Intensionality and Truth. An Essay on the Philosophy of A.N. Prior. 1996 ISBN 0-7923-4119-8 256. L. Hankinson Nelson and J. Nelson (cds .): Feminism, Science, and the Philosophy of Science. 1997 ISBN 0-7923-4162-7 257. P.1. Bystrov and V.N. Sadovsky (eds.): Philosophical Logic and Lagical Philosophy. Essays in Honour of Vladimir A. Smirnov . 1996 ISBN 0-7923-4270-4 258 . A.E. Andersson and N-E . Sahlin (eds.) : The Complexity of Creativity. 1996 ISBN 0-7923-4346-8 259. M.L. Dalla Chiara, K. Doets , D. Mundici and J. van Benthem (eds.): Lagic and Scientific Methods. Volume One of the Tenth International Congress of Logic, Methodology and Philosophy of Science, Florence, Augus t 1995. 1997 ISBN 0-7923-4383-2 260. M.L. Dalla Chiara, K. Doets, D. Mundici and J. van Benthem (eds.) : Structures and Norms in Science . Volume Two of the Tenth International Congress of Logic, Methodology and Philosophy of Science, Florence, August 1995. 1997 ISBN 0-7923-4384-0 Set ISBN (Vols 259 + 260) 0-7923-4385-9 261. A. Chakrabarti : Denying Existence. The Logic , Epistemology and Pragmatics of Negative Existentials and Fictional Discourse. 1997 ISBN 0-7923-4388-3 262. A. Bilet zki: Talking Wolves. Thomas Hobbes on the Language of Politics and the Politics of Language . 1997 ISBN 0-7923-4425-1 263 . D. Nute (cd .): Defeasible Deontic Logic. 1997 ISBN 0-7923-4630-0 264 . U. Meixner: Axiomatic Formal Ontology. 1997 ISBN 0-7923-4747-X 265. I. Brinck : The Indexical T . The First Person in Thought and Language. 1997 ISBN 0-7923-4741-2 266. G. Holmstrom-Hintikka and R. Tuomcla (eds.): Contemporary Action Theory. Volume 1: Individual Action . 1997 ISBN 0-7923-4753-6; Set : 0-7923 -4754-4
SYNTHESE LIBRARY 267. G. Holmstrom-H intikka and R. Tuomela (eds.): Contemporary Action Theory. Volume 2: Social Action. 1997 ISBN 0-7923-475 2-8; Set: 0-7923-4754-4 268. B.-C. Park: Phenomenological Asp ects of wittgenstein's Philosophy. 1998 ISBN 0-7923-48 13-3 269. J. Pasn iczek : The Logic of Intentional Objects. A Meinongian Version of Clas sical Logic. 1998 Hb ISBN 0-7923-4880-X ; Pb ISBN 0-7923- 5578-4 270. P.w. Humphreys and J.H. Fetzer (eds.): The New Theory of Ref erence. Kripke, Marcus, and Its Origins . 1998 ISBN 0-7923-4 898-2 27 1. K. Szaniawski, A. Chmielew ski and J. Wolenski (eds.): On Science, Inference, Information and Decision Making. Selected Essays in the Philosoph y of Scienc e. 1998 ISBN 0-7923 -4922-9 272. G.H. von Wright: In the Shadow of Descartes. Essays in the Philosophy of Mind . 1998 ISBN 0-7923-4992-X 273. K. Kijania-Placek and J. Wolenski (eds.): The Lvov-Warsaw School and Contemporary Philosophy. 1998 ISBN 0-7923 -5105-3 274. D. Dedrick: Nam ing the Rainbow. Colour Language, Colour Science, and Culture. 1998 ISBN 0-7923-5239-4 275. L. Albertaz zi (ed.): Shapes of Forms. From Gestalt Psychology and Phenomenol ogy to Ontology and Mathemati cs. 1999 ISBN 0-7923-5246-7 276. P. Fletcher: Truth, Proofand Infinity. A Theory of Constructions and Constructive Reason ing. 1998 ISBN 0-7923-5262-9 277. M. Fitting and R.L. Mendelsohn (eds.) : First-Order Modal Logic. 1998 Hb ISBN 0-7923-5334-X; Pb ISBN 0-7923-5335 -8 278. J.N. Mohanty: Logic, Truth and the Modalitiesfrom a Phenomenolog ical Perspective. 1999 ISBN 0-7923-5550-4 279. T. Placek : Mathematicallntiutionism and Intersubj ectivi ty. A Critical Exposition of Arguments for Intuitionism . 1999 ISBN 0-7923-5630-6 280. A. Cantini , E. Casari and P. Minari (eds.): Logic and Foundations ofMathematics . 1999 ISBN 0-7923 -5659-4 set ISBN 0-7923 -5867-8 281. M.L. Dalla Chiara, R. Giuntin i and F. Laudisa (eds.): Language, Quantum, Music. 1999 ISBN 0-7923-5727-2 ; set ISBN 0-7923-5867-8 282. R. Egidi (ed.): In Search ofa New Humanism . The Philosophy of Georg Hendrik von Wright. 1999 ISBN 0-792 3-5810-4 283. F. Vollmer: Agent Causality. 1999 ISBN 0-7923-5848-1 ISBN 0-7923 -5865-1 284. J. Peregrin (ed.): Truth and Its Nature (if Any). 1999 285. M. De Caro (ed.): Interpretations and Causes. New Perspectives on Donald Davidson 's Philosophy. 1999 ISBN 0-7923 -5869-4 286. R. Murawski : Recursive Functions and Metamath ematics. Problems of Completeness and Decidabil ity, Godel 's Theorems. 1999 ISBN 0-7923-5904-6 287. T.A.F. Kuipers: From Instrum entalism to Constructive Realism. On Some Relat ions between Con firmation, Empirical Progress. and Truth Approx imation. 2000 ISBN 0-7923-6086-9 288. G. Holmstrom-Hintikka (ed.): Medieval Philosophy and Modem TImes. 2000 ISBN 0-7923-6102-4 289. E. Grosholz and H. Breger (eds.): The Growth of Mathematical Knowledge. 2000 ISBN 0-7923-6151- 2
SYNTHESE LIBRARY 290 . G . Sommaruga: History and Philosophy of Constructive Type Theory . 2000 ISBN 0-7923-6180-6 291. J. Gasser (cd .): A Boole Anthology. Recent and Classical Studies in the Logic of George Boole . 2000 ISBN 0-7923-6380-9 292 . Y.F. Hendricks, S.A. Pedersen and K.F. Jergen sen (eds .): Proof Theory. History and Philosophical Significance. 2000 ISBN 0-7923-6544-5 293 . wt, Craig: The Tensed Theory of Time. A Critical Examination. 2000 ISBN 0-7923-6634-4 294. WL. Craig : The Tenseless Theory of Time. A Critical Examination. 2000 ISBN 0-7923-6635-2 295 . L. Albertazzi (cd .): The Dawn of Cognitive Science . Early European Contributors. 2001 ISBN 0-7923-6799-5 296. G. Forrai : Reference , Truth and Conceptual Schemes . A Defense of Internal Realism. 2001 ISBN 0-7923-6885-1 297. Y.F. Hendricks, S.A . Pede rsen and K.F. Jergensen (cds .): Probability Theory . Philosophy, Recent History and Relations to Science. 2001 ISBN 0-7923-6952-1 298 . M. Esfeld: Holism in Philosophy ofMind and Philosophy of Physics . 2001 ISBN 0-7923-7003-1 299 . E.C. Steinhart: The Logic of Metaphor . Analogous Parts of Poss ible Worlds . 2001 ISBN 0-7923-7004-X 300. To be published. 301. T.A.F. Kuipers: Structures in Science Heuristic Patterns Based on Cognitive Structures. An Advanced Textbook in Nco-Classical Philosophy of Science. 2001 ISBN 0-7923-7117-8 302 . G. Hon and S.S. Rakover (eds .): Explanation . Theoretical Approaches and Applications. 2001 ISBN 1-4020-0017-0 303. G. Holmstrom-Hintikka, S. Lindstrom and R. Sliwinski (eds .): Collected Papers ofStig Kanger with Essays on his Life and Work. Vol. I. 2001 ISBN 1-4020-0021-9; Pb ISBN 1-4020-0022-7 304. G. Holmstrorn-Hintikka, S. Lindstrom and R. Sliwinski (eds .): Collected Papers ofStig Kanger with Essays on his Life and Work. Vol. II. 2001 ISBN 1-4020-0111 -8; Pb ISBN 1-4020-0112-6
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