Lecture Notes in Mathematics Edited by A. Dold and B. Eckmann
552 C. G. Gibson K.WirthmQller A.A. du Plessis E.J.N. Loo...
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Lecture Notes in Mathematics Edited by A. Dold and B. Eckmann
552 C. G. Gibson K.WirthmQller A.A. du Plessis E.J.N. Looijenga
Topological Stability of Smooth Mappings
~
~..
Springer-Verlag Berlin.Heidelberg 9New York 1976
Authors Christopher G. Gibson Department of Pure Mathematics University of Liverpool P. O. Box 147 Liverpool, L69 3BX/Great Britain Klaus WirthmLiller Fachbereich Mathematik d. Universit~t Postfach 397 8400 Regensburg/BRD Andrew A. du Plessis School of Mathematics and Computer Science University College of North Wales Bangor Gwynedd, LL57 2 UW, Wales/Great Britain Eduard .1. N. Looijenga Mathematisch Instituut der Katholieke Universiteit Toernooiveld Nijmegen/The Netherlands
AMS Subject Classifications (1970): 57D45, 58C25 ISBN 3-540-07997-1 ISBN 0-387-07997-1
Springer-Verlag Berlin 9 Heidelberg 9 New York Springer-Verlag New York 9 Heidelberg 9 Berlin
This work is subject to copyright. All rights are reserved, whether the whole or part of the material is concerned, specifically those of translation, reprinting, re-use of illustrations, broadcasting, reproduction by photocopying machine or similar means, and storage in data banks. Under w 54 of the German Copyright Law where copies are made for other than private use, a fee is payable to the publisher, the amount of the fee to be determined by agreement with the publisher. 9 by Springer-Verlag Berlin 9 Heidelberg 1976 Printed in Germany Printing and binding: Beltz Offsetdruck, Hemsbach/Bergstr.
Preface
During the academic year 1 974-75 the Depar~nent of Pure Mathematics in the University of Liverpool held a seminar on the Topological Stability of Smooth Mappings:
the main objective was to piece together a complete proof of the
Topological Stability Theorem (conjectured already by Them in 1 960, and proved by Mather around ~ 970) for which no published account existed.
This volume comprises
a write-up of the seminar by four of its participants. There are several acknowledgements which should be made.
Any mathematician
working in this area is conscious of his debt to the inventiveness of Them, and to the technical work of Mather which has placed much that was conjecture on a firm mathematical foundation.
As far as the seminar is concerned I would like to
single out the special contribution of Eduard Looijenga, who showed us how to fill in gaps which otherwise might have remained open.
Also, I would like to
acknowledge the considerable help offered by Terry Wall, from the inception of the seminar to the production of the typescript.
Further acknowledgements are due
to the seminar audience (who frequently had good reason to appear confused) for their patience arKl in particular to Tim Ward who helped out with the talks;
to
the British Scientific Research Council who provided financial support for Eduard Looijenga, and the University of Wales whose financial assistance enabled Andrew du Plessis to participate in the seminar;
to Los Lander who was inveigled
into drawing the diagrams, and did an excellent job;
to Dirk Siersma and
Klaus Lamotke whose careful reading of parts of the manuscript removed many errors; and finally to Evelyn Quayle, Jean Owen and Margaret Walker who produced a first-class typescript.
Liverpool, July 1976o
C. @. Gibson.
Contents
Introduction Chapter
I
: Construction of Canonical Stratifications
w
Whitney Stratified Sets
w
Semialgebraic Sets
17
w
Thom Stratified Mappings
22
Chapter
II
:
9
Stratifications and Flows
w
Tubes
36
w
Tube Systems
41
w
Vector Fields
50
Flows
53
Applications
58
w Chapter III
: Unfoldin~s of Smooth Map-Germs
w
Introduction
65
w
Pre] ~m~ uaries, mostly algebraic
73
w
Infinitesimal Stability
80
w
Versality
86
Contact- equivalence
94
w
w Chapter
IV
Determ~ nacy
1o5
Jet-spaces and a transversality theorem
111
@enerioity
t20
: Proof of the Topological Stability Theorem
w
Multi - transversality
125
w
A stratification of the jet space
131
w
Properties of the stratification
w
Topological stability as a transversality property
145
References
15o
Index
152
Symbols
155
Introduction Motivation and some historical remarks. The
C~176
f
and
f'
from a manifold
to be
C l -equivalent
(l = 0, l, 2, ..., oo)
h
N
P
of
and
h'
of
equivalenoe relation: 'C g -behaviour'. of
f
We call a
to a manifold
if there exist
f' = h' o f o h -1.
it simply says that
~ith respect to
function space
such that
N
Coo-mapping
f
and
f'
~
C e -stable
if the e ~ i v a l e n c e
This presupposes a topology on
increases.
Coo-mapping can be approximated by a C~
mappings,
f
class
in the
C~176 P):
we choose
Obviously, this property
There is an important question, related to
this notion, which has also some physical interest.
the set of proper
This is clearly an have the same
the Whitney topology (see Ch. IV for the definition). becomes stronger as
are said
C~-automorphisms
C t- equivalence) forms a neighbourhood of
Coo(N, P).
P
Namely, whether any proper
C l -mapping or more precisely, whether among
Cpr(N , P),
the
C t-stable
ones are dense.
The Morse lemma and the Whitney embedding theorem imply that the answer is yes if
dim P = 1
or greater than
2 dim N (and
e
arbitrary).
H. ~%itney seems to
have been the first to investigate this question in its own right. he showed that the answer is affirmative in case included a fairly simple characterisation of
In 1955 [W~]
dim N = dim P = 2.
His proof
Coo-stable mappings between surfaces.
A few years later, in 1959, Thom [TL] gave examples of proper smooth mappings from I~n
to
I~n
(n ~ 9)
which cannot be approximated by a
A complete answer to this question for 1967.
I = oo
In his fundamental series 'Stability of
C 2 -stable mapping.
was given by J.N. Mather around Coo-mappings'
[I-VII
obtains among other things a (mult~ltransversality criterion for For certain pairs
(n, p):= (dim N, dim P),
he
Coo-stability.
this transversality criterion
involves unccuntably many tramsversality conditions.
As one may expect, in such
a case these transversality conditions cannot be simultaneously satisfied by a dense subset of
Coo (N, P). pr
Thus Mather was able to determine the pairs
for which the answer to our question proper mappings are dense in of the following conditions
(with
Cpr(N , P)
~ = oo)
is yes:
if and only if
the
(n, p)
(n, p)
~~ satisfies one
n
dim X .
obtained from another, Also,
submanifold of X - ZX,
Y -
The set
~P
f : X I -~Y
- f(zx)
dim Y ,
dim X ,
is a semialgebraic smooth
since it is obtained from another,
with
In this way we obtain a surjective
dim YI > dim X I .
A point in
YI
f : XI -~Y1 "
We conclude that indeed
is a regular
f(X I) .
has at least one regular value - by Sardis Theorem, for instance -
surjectivity of
is a
since it is
if and only if it does not lie in the image
I
is
~Y, b y deleting a closed semialgebraic set of lower
of dimension
f : XI -*YI
YI = Y - z Y
of dimension
by deleting a proper closed subset.
Value of
f(ZX)
Using the induction hypothesis
X I = X - f-1 (ry U f ( Z X ) )
I~n
smooth mapping
f
(2.3) .
is semialgebraic, of
aim ( Z X ) < dim X .
semialgebraic smooth submanifold of
dimension.
ZX
But
contradicting
dim Y ~ dim X . Q. E. D.
(3.3)
Let
f :
be ~@mial~eb~aic, with PToof on
A~ain,
dim Y .
~n flX
Y = f(X)
When
-~
Rp
be a pol.ynomial mapping, and la~
finite-to-one:then
dim f(X) = dim X .
is semialgebraic.
dim Y = 0
This time we proceed by induction
the result is clear.
and that the result holds for lower dimensions. ZY
X _. R n
is semialgebraic, of dimension < dim Y .
Suppose
dim Y
is positive,
By (2.5) the singular set Using the induction hypothesis,
and (3.2) , we have dim (flX)-I(zY) = dim (Zy) Now
XI = X - ZX
dim X ,
- (fiX) -I (ZY)
< dim Y ~ dim X .
is a smooth submanlfold of
m n
of dimension
since it is obtained from another, X - ZX, by deleting a closed
semialgebraic subset of lower dimension . submanifold of
~P
one smooth mapping
of dimension f : Xl -*Ys "
dim Y .
And
YI = Y - z Y
is a smooth
In this way we obtain a finite-to-
By shrinking
XI
we can suppose
f : XI -*Ys
30
has constant rank.
Assume
dim X 9 dim Y .
construct a non-trivial smooth vector field
It will then be possible to ~
on
xI
with
Such a vector field has a non-trivial flow line, on which contradicting the finite-to-one condition.
Thus
f
6(XI) _C ker T(flXl), is constant,
dim X = dim Y . Q.E.D.
(3,4)
Let
f : 1~n -~ m p
~e a Dolvnomi@l mapping, and let
8 semial~ebraic smooth submanifold, fiX
The @et
fails to be i=~ersive is semial~ebraic.
one then
Sg(flX)
Proof
First, we show that
X
A
TX
X
subset of
=
subset of with
x,y ~ X
~n x ~n x ~n
x, y E X
and
will correspond to
Now we show that suppose
f
and
precisely
T ( ~ n) :
Sg(flX) ,
Finally, assume
comprising triples
Let
f
necessary.
(x, y, v)
of points
A be the diagonal in T I~n
with
is semialgebraic. (Factor
9
A x I~n
~n x ~n :
the semialgebraic
f
Observe first that we can
as the composite of the natural Let
8(~n)
denote the
By the above the set ker Tf ~ TX ~ s(~n)
its image under the projection
is
T(1~n) -~ ~ n
is
ar~l semialgebraic, by the Tarski-Seidenberg Theorem. flX
finite-to-one.
so there is an open set" U C X suppose
of
TX .
Sg(fIX )
T(~n)
(x, y, v)
x $ y 9
embeddi~ in its graph, and a linear projection.) umit sphere bundle in
~n
x = y .
a linear projection,
semialgebraic in
is finite-to-
For hhis we use the fact
comprising triples
then, under the natural identification of A ~ B
where
We put
Clearly, both A, B are semialgebraic,
set
fl x
X
is the limiting position of lines in
~ n • l~n • ~ n
cellinear points with B
Moreover, if
is semialgebraic.
at two distinct points. =
of points in
be
has dimension < dim X .
that a tangent line at a point on cutting
Sg(flX)
X C ~n
Suppose that
at no point of which
has constant rank on
U ,
replacing
U
f
dim Sg(flx) = dim X ,
is immersive.
We can
by a smaller open set if
It will now be possible to construct a non-trivial vector field
31
on
U
on which
with f
~(U) ~ ker Tf .
Such a vector fiel~ has a non-trivial flow line,
is constant - contradicting the hypothesis that
It follows that indeed
f
is finite-to-one.
dim Sg(flX ) < dim X . q. E. D .
The preliminary work is now complete and we are in a position to establish the existence of canonical partial stratifications for generic polynomial mappings.
(3.5) an~
Let
f : A ~ B
A, B
be semial~ebraic open sets in
a pol.ynomial mappin~ for which
admits a canonical ~artial stratification
~
flZ(f)
~n,
~p
respectively ,
is finite-to-one,
f
having only finitely ma~v
semial~ebraic strata. Proof
Observe that the set
that the set
C
of critical points of
f
is semialgebraic, so
of critical values is likewise semialgebriac, by the Tarski-
Seidenberg Theorem.
Put
C = Cc D - Cc-1 -D 00''" . dim Cj ~ j ,
Z
c = dim C .
of
C
We shall construct a filtration
by semialgebraic sets, closed in
C , with
such that the following conditions are satisfied for each
j
with
Mj : C. - C j ~ (PS0) which each
M. ~
(PSi)
is empty, or a smooth suhmanifold of
is Whitney regular for f-IM. ~ Z
f-1~ - Z
is a smooth submanifold of
is Whitney regular over
Suppose inductively that to this prescription. dim C. = j .
If
N ,
for
k > j .
f-lMj ~ ~
for
k ~ j .
over
we take
have been constructed according
Cj_ 1 = C j
We put
:
j
closure { u w %
which is semialgebraic, of dimension < J .
k>j
,
Now p u t
c~ = f-l(cj_~t)n~.
and the restriction
f-IM. ~ Z
Cc, Cc_ I ,..., Cj
dim Cj9 < j
of dimension
k > j .
f : f-IM. ~ Z ~ M . is a local diffeomorphism, J J (PS2) f ' I M k ~ Z is Whitney regular over (PS3)
P
ar~l are done.
Suppose
32 which is semialgebraic of dimension R2
j , by
We define
(3.3) 9
R 2' U R2"
=
where R 2'
=
closure
w(cj, ,
n
closure {kYj W(0j ,
-
and R2" Clearly
R 2' , R2"
(and hence
R2)
are semialgebraic, of
dimension < j
.
Next,
put R3 which is semialgebraic, of
=
clos~e of
dimension < J, Ca"
=
=
closure of
J ,
(3.~) 9
Also write
and
W(Cj", f'IfCj" - P)
which is semialgebraic, of dimension < J .
c j-1
by
- R 2)
Cj' - R 2 - R 3
which is semialgebraic, of dimension
R$
s~(flcj'
Finally, define
= ~1 uf(R 2 u ~ 3 U ~ )
which is semialgebraic, of dimension ~< (J - I) , by (3.2) . That completes the induction step of the construction. reader the task of formally checking that the partition of the required canonical partial stratification of
C
We leave to the by
the
M
J
is
f . Q.E.D.
Now let f : A -~ B (3.5)
f
A, B be semialgebraic open sets in Euclidean spaces, and
a polynomial mapping which satisfies the Generieity Condition. admits a canonical partial stratification
a Thom stratification
(~, l~),
And by (3.1)
f
admits
namely the Thom stratification associated to
this we call a canonical Thorn stratification for main result of Chapter I .
6 .
By
f .
@ :
Sunning up, we obtain the
33
(3.6) f : A ~ B then
Let
A, B
be semialgebraie open sets in Euclidean spaces, and let
be a polynomial mapping which satisifes the Generioi~y Condition :
f admits a canonical Thom stratification
(I, i~ ) .
It is this result which enables us to construct the crucial stratification of the jet space in Chapter IV .
We conclude the present chapter by listing
the basic properties of canonical partial stratifications require~ for Chapter IV. First, it is invariant under smooth equivalence of smooth mappings; precisely
(3.7) g, h
with
Le__~t fl' f2 f
I stratification @2
~e smooth m~ppings ~or which there exist diffeomoruhisms
o g = h o f2 " ~
9
and let
Suppose that @2
fi
admits a canonical partial
be the stratification induced ~7
is ~ canonical partial stratification for
h :
then
f2 "
The proof consists of no more than a (tedious) formal checking - which is also the case for
(3.8) stratification then
@'
Let
f : N * P
@ .
Let
be a smooth mappin~which admits a canonical partial
P' ~ P
be open, let
N' = f-Ip, ,
is a canonical partial stratification for
an~ let
f : N' ~ P '
@' = C]P' :
.
Another result for which it does not seem worthwhile writing down a proof is
(3.9)
Le__~t f : N -~ P
stratification
@ .
of
@
f .
Then
And let
be a smooth man~in~ which admits a canonical uartial U C N
be an open set containing the critical set
also provides a canonical partial stratification for
flU .
The final fact which we shall need to know later is
(3.1o)
Foxr I ~ J ~ s
le_tt fj9 : N.J -*p
domains having the same dimension, and let
be smooth mappings~ with
f : N -~ P
be their disjoint sum.
34 Suppose each
fj
admits a Them stratification
are in ~enera I position, ~' = ~ ~j' .
(~, ~)
.
f
(
,
admits a Thorn stratification
Moreover, if the
(~,i~)
with
(Ej, lj') are all canonical then so too is
CHAPTER
Stratifications
II
and Flows
Klaus WirtmOller
$6
w
Tubes
This chapter is concerned with the construction of continuous flows on stratified sets.
Since strata are smooth manifolds we can clearly obtain a smooth
flow on each stratum of a stratification by integrating a smooth vector field.
But
in general we cannot expect to obtain a continuous flow on the whole set by just putting the parts together. special nature:
Therefore the vector fields we consider will be of a
in a sense to be made precise they will be controlled along the
boundary of each stratum in such a way that we do obtain continuous flows.
Let us
illustrate the idea by means of an example. (i. i )
Example.
field on
Stratify the plane
~ 2 by
IO, I~2 - O~
and let
~
be the vector
2 2 defined by
~(0) = O, (in standard coordinates).
~(x, y) = ~
~/~ IF(~, y -ei
o~J
for
(x, y) i o
Clearly, the origin is a fixed point and all other flow
lines are circles centred at the origin.
Note that
jjl 9
/
outside the origin all flow lines have constant speed velocities
II~(x, y)IIAI~x, y~I
have constructed a flow on
tend to infinity as
II~ll : 1 (x, y)
whence their angular
approaches
0 .
2 2 which is not differentiable at the origin.
Thus we On the
other hand distance to the origin is constant along any flow line, and this implies at once that the flow is continuous. This simple tYpe of control by the distance to the smaller stratum will not be sufficient to ensure continuity of the flow unless this stratum is a discrete set.
37
The next example indicates another type of control over a stratum of positive dimension. (1.2)
Example.
Split
it3-~t~ it2
and stratify it by
[it x 0,
~ x(m2
- 0)1 .
Then w(t, x, y) = a/at + ~(x, y) defines a vector field
W
on
it • it2 , with
~
as in (1.1).
linear flbw on the t - axis whereas the other flow
U
induces a
lines spiral round the t - axis.
This time the proof that we have a continuous flow
on
~3
is basea on two
observations : (1)
the flow preserves distance to the t - axis,
(2)
under the canonical retraction (t, x, y)
(say)
and
it x it2 ~ ~ x 0 the flow line through
is mapped to the flow line through
(t, 0, 0)
on the t-axis.
Our strategy in the general case will be to look for vector fields having properties
(I) and (2) locally, i.e. in some neighbourhood of the "smaller" stratum.
We will give a meaning to "distance" and "retraction" in this context by taking this neighbourhood to be a tube.
But first of all let us introduce the following
notion which will be convenient later on. (I. 3 )
Definition.
that two maps
Let
gl' g2
X, Y, Z
defined on
if there exist neighbourhoods coincide on
Z ~ U
(on
U
be subsets of a topological space Z
of
Z N U ~ V,
define the same X
and
V
of
respectively).
~erm at Y
in
N
X
(at
such that
N ~
We say
(X, Y)) gl
and
g2
38
Note that we do not require that clear that the composition
X
or
Y
be contained in
Z.
It should be
of two suitable germs, or one germ and a map, is a well-
defined germ. Now we give the precise definition of "tube". (1.4) (X
Definition.
Let
X _c N
need not be closed in
where
~ : E~
X
N).
diffeomorphism,
p
T
(at
X)
= p o e
-1
retraction
A tube at
E,
and
e : E-* N
of the inclusion : N~
9
X _c N.
go : ~
(2) means that
retracting
that
~3
T = (E, ~, p, e)
T
~(X) so that
g,
x go
SR2-. ~
be the projection
~
~3
g o ~
(I. 2 ) once
to the first factor then
to hhe linear flow on the real
S/at.
Conversely,
given any submer-
suppose we wish to construct a flow on ~
I~3 ,
under
g.
For
(2) and the reason for this is that
tube rather than a tube which is compatible with
g
in
sense.
Definition.
and
and
By abuse of language we will
of tubes let us look at Example
maps the flow on
onto
Let
T
(or a germ of such a map at g
is the
T.
(2) refers to the standard
(1.5)
e o ~
X ; we call them the germs of the T .
no such flow will have the property
the following
of a local
= ~ o e -1 : N ~ X
preserving the strata and mapping to the standard linear flow on general
N
the quadratic function
~ : X-~ E
Observe
llne generated by the constant vector field g
~
is the germ at
and the distance function defined by
If we let
sion
p : E~
are well defined germs at
Before we come to the construction
property
is a quadruple
commuting with the zero section
often omit the superscript
more.
X
is a (smooth) vector bundle,
of a Riemannian metric on
germ
be a submanifold of ~he smooth manifold
T
be a tube as in ( 1 . 4 ) X).
T
and let
is compatible with
g
g : N ~ P if the germs
be a map (at
X )
are equal.
Thus each fibre of
T
should be contained in a fibre of
to find compatible tubes only for very special
g,
g .
We can expect
and the remainder of hhis
section is devoted to the proof of the following existence result.
39
(1.6)
Theorem.
Let
N, X C N
be a smooth map germ at
X
such that
(relatively) owen subsets of compatible with such that
g,
and
X
with
P
be smooth manifolds, and let
glX
is a submersion.
XI ~ X _c X u .
then there exists a tube
T
-If -
Suppose
TO
a_~t X ,
XI c X~
is a tube at
are
Xo,
also compatible with
g,
TIX I = ToIX I.
Proof.
Our proof depends on a standard method of constructing tubes, see [Lang]
or [BrScker-J~nich]
:
choose any spray
~
on
N
and let
e~
be the germ at
of the associated exponential map, restricted to a normal bundle in
g : N-. P
N.
Then
T = (E, ~, 99 , e~ )
is a tube at
E.
Let
X
T
from a careful choice of
Let us deal with the latter first. Tg : TN-* TP
the kernel rank of
g
denote the differential of
g.
Since
is constant in a neighbourhood of
generality to assume that this neighbourhood is all of suhbu_ndle of Let
of
X
We shall obtain the required extra properties of and
~ : E ~ X
X
TN, and furthermore we have
To = (Eo' ~o' Po' eo)"
is submersive
X, and it is no loss of N.
ker Tg + TX = TN
The differential ~
gIX
e~
Then
ker Tg
over
X.
is a
along the fibres of
~o
is a monomorphism Tfibrer ~e o) : E o -* TNIX ~ of vector bundles, by means of which we~dentify we must have
E ~ _c (ker Tg)IX ~
since
TO
E~
with its image in
is compatible with
Now if we pick a Riemannian metric on the bundle we also get a metric
~o
on
(ker Tg)IX ~
orthogonal sum of the Riemannian bundles Po
Then
g.
TX ~ ~ (ker Tg)IX ~ = kerT(glXo)
splitting the latter bundle into the
ker T(glXo)
and
E~
(here we think of
as a Riemannian metric rather than a Quadratic function).By a standard extension
process we find a metric E
TNIX o.
~
on
(ker Tg)IX
be the orthogonal complement of
and let and leave
p
be
~IE.
EIX I = EolXI, X
Then
E
ker(TglX)
such that in
~ = ~o
(ker Tg)IX
is a normal bundle of
i.e. for any choice of the spray
in the right direction.
X ~
over
X I.
We let
with respect to
such that
E _c (ker Tg)IX
its solution curves will
40
T = (E,T, p, %)
Thus
will h~ve all required properties if the spray
satisfies
(1)
~(ker Tg) ~ T(ker Tg)
(2)
e~I(EIX l) = eol (EIX I) . But finding such a spray is a local problem in the following sense:
construct of
X
locally near any point
by open subsets of
N
x e X
X,
we
can
then we find a locally finite covering
on which the local parts of
~
A
are defined.
partition of unity subordinate to this covering gives us a spray neighbourhood of
if
~
On some
satisfying (1) and (2), and this is clearly enough.
We deal with the local problem of defining
~
near a point
x e X
by
linearising the situation, as follows. (a)
let
x E X o.
for
P
Since
near
gx
gIX e
is submersive we find charts for
with respect to which
glX ~
linear coordinates in the normal space x :
via
e
we obtain an
O
Note that since
T
N-chart
EolX near
is compatible with
g
and a trivialisation of x
g,
N,
if
x E X - X
Choose E~
extending the chart for g o e
and
near
X . O
is constant along the
N-
and
P - charts.
Now let
be the standard geodesic spray on Euclidean space.
leave it to the reader to check that (b)
x
O
is automatically linear in the
in the chart on
near
is a linear projection.
O
fibres, so
X~
we define
~
~
~,
We
satisfies (1) and (2).
as in case (a)
but use any chart on
N
which
O
linearises
g .
Then
neighbourhood of
x
~
clearly has property (1), and if we shrink to a
staying well away from
X1
we may ignore (2).
Note that Theorem (1. ~ ) still holds if we allow the components of
KS P
to have
different dimensions. (1. 7 )
Corollary.
Theorem (1. 6 ) remains true if
0nly at an open subset Proof.
Xg
o_~f X
Choose an open subset
Theorem (1. 6 )
to
with
X 1 ~ Xg,
TO
over
N
g
containing N
g
in place of
of N .
hence a tube at
N
g
is not a germ at
X
but
X - X 1.
such that
X
g
= X ~ N g
We obtain a tube at X 1 U Xg = X . []
X
g
and apply which coincides
41
w We return to the problem of means of tubes.
Tube Systems controlling vector fields on a stratified set by
Let us first study the cross-~atio example mentioned in the
introduction in more detail. (2.1)
Example.
Let
Y : JR-*(0, co)
be a smooth function and let
A c SR3 be
defined by the equation (.)
xy(x + y)(x - y(t). y) = 0 .
x
A
is stratified by the
t - axis
canonical Whitney stratification). Whitney stratification of
I~3 .
X
and its complement
Adding
IR3 - A
(in fact this is a
as a third stratum, we obtain a
Suppose now we are looking for flows on
(i)
preserve the strata ,
(2)
project to hhe standard linear flow on the t - a x i s (t, x, y)
Y
and under the retraction
-* t.
First notice that this problem cannot have a smooth solution. every
point
tangent spaces
2 3 which
(t, O, 0)
on the
t-axis
TxA (x E A, x -* (t, 0, 0))
containing the t - axis.
,
For at
the limiting positions of consist of four planes in
The cross-ratio defined by the corresponding
SR3 ,
concurrent
lines in the projective plane is, after suitable ordering of the lines, just A smooth flow satisfying
(1) and (2) must preserve the cross-ratios,
each
which is
~(t).
42
impossible unless 7
happens to be constant.
any strata-preserving
C1
Note that in fact we have shown that
flow must be trivial on the t - a x i s .
Next let us try to piece together a continuous solution, smooth on each stratum. Trivially condition (2) determines our flow on
X .
If we take
~
then we clearly find a unique solution on
A
canonical tube at
X
controlled by
(i.e. commutes with the retraction and preserves
function of
~ ~).
But for an arbitrary tube
TY
at
Y
impossible to extend this solution further to a flow on both
~
and
TY.
retract neither along the fibres of
which is the distance
it will generally be I~3 which is controlled by
The obstruction comes from the fact that X ~
to be the
~Y
nor along the surfaces
will in general X p = constant.
The conditions we have to impose on the tubes in order to make such extensions possible are most conveniently (2.2)
Definition.
and let
~
and
Let
TY
phrased in terms of germs (see (I. 3 )). X
and
be tubes at
Y
X
be submanifolds of the smooth manifold
and
Y.
We write
X
instead of
~ TX
N, etc.
Let us introduce the commutation relations (CRvr)
~rX O r Y
=
T/X
(c~p)
pXo Y
=
px ,
both being equations between germs at submanifold of another smooth manifold map
Y
into
y'.
(CRf)
(X, Y). N',
Furthermore, let
with a tube
Y'
TY' , and let
be a f : N -* N'
Then we will also have to consider y, f o ~Y = ~ o f (as germs at Y) .
The reason for introducing this last relation will become clear shortly.
Note
that the three commutation relations, put in a different way, require that TY be y, compatible with X , pX and ~ o s respectively. In view of the submersiveness condition in the existence theorem for tubes
( 1 . 6 ) the following lemma is the key
to further progress. (2.3) manifold
Lemma.
Let
N, and let
the map germ
(at
~
X
and
Y
be disjoint smooth submanifolds of the smooth
be a tube at
X.
X)
(x, px~l Y
: Y~Xx
If
Y
is Whitney regular over
X
then
4S
is submersive. Proof. x e X
If it is not, we find a sequence such that
( X, pX)iy
isation of the tube X = A px 0 at
Yi
in
and
kernel of APx
( X, pX)iy
~Yi
we may assume L
in
in An .
(TyiY) ~ T
a line in
near
An
x
Since
converging to some point
Yi"
Choosing a local trivial-
TX
is the standard tube at
( X, pX) : A n ~ A p x A
is not we conclude that Yi"
Y
we may assume that
T iY
is not transverse to the
By compactness of the Grassmannians of subspaces of and
(xy i-* ) -* L
where
T
so
Y
+
L in
~n.
An
is a p - dimensional subspace and
Using a simple convergence lemma we see that
+ L ~ T,
is a submersion
This kernel is the orthogonal complement of
to the orthogonal complement of l~Px 0 TxX + L = A p x 0
in
is not submersive at
N = A n = A p x A n-p.
( X, pX)
0 +
TX
(yi)
T
is net transverse
But this implies
is not Whitney regular over
X
at
x . KS
The strategy outlined so far will enable us to lift a smooth flow on a manifold to a controlled flow on a stratified set. necessary)
to look also at a more general problem:
f : A -* A' (say)
and a controlled flow on
A
which is mapped to the given one under
X
and
and
Y
X'
and
on
A'
Y
in
A
A' f ?
A'.
But if
does there exist a controlled flow on If we restrict attention to two strata
f(X) ~ X'
and
f
f(Y) ~ Y'
are different strata then the requirement that the flow on
: ~ x ~2...4,, ~ 2 .
maps
X
(say) where A
will interfere with the control exercised by the distance function
simple example is provided by (I. 2) and (I. 1 )
f
given a stratified map
then there is nothing new about the situation provided
into a single stratum in Y'
It is natural (and will in fact become
lift that pX.
together with the projection
A
44
The example suggests that the control by
pX
should be disposed of in these instances
since a similar control is already effected by the map the target:
f
the t - a x i s .
f
together with the flow in
keeps the spiralling flow line automatically at constant distance to X ~ ,
On the other hand we do need control by the retraction
is why (CRf) was introduced. but involving
7
X
and
f
and this
We are heading now for a result analogous to ( 2 . 3 ) X ~
rather than
pX.
and
Before we can state it we
need a bit of technical preparation. Let N
f : N~N'
be a smooth map sending the smooth submanifolds
submersively into
submanifolds of such that
X'
N'.
and
Y'
respectively, where
X'
and
Furthermore, suppose we are given tubes at
(CRy) holds for the pair
Replacing the germ (at
X')
~
X'
(X', Y' )
: Y' ~ X'
and
(CRf)
Y'
X
and
Y
in
are smooth X, X'
holds for
X
and and
Y' X'.
by a smooth representative we form the
pullback
proj X xx, Y'
- -@
Y'
II proj
~
X'
I
X
)
X Xx, Y' = I(x, y') E X x Y' : fx = X ' y , ~ ) .
(i.e.
submersion
X •
the germ of
Y'
X'
Since
f : X ~ X'
is a
is a smooth manifold, and the commutation relations imply that
(X, Y) X, (
actually maps into
y!
X Xx,
~
Y'
o f) : N ~
X x Y'
.
Clearly, this property does not depend on the choice of a representative above, and we are now ready to state the following. (2. ~ )
Lemma.
with respect to
If, under the assumptions above, f
Y
is Thom regular over
X
then
(x,
f)[y
: y ~ x •
Y'
y,
is a submersive ~erm at Proof. such that
X
(notice that
If not, we find a sequence (~X, f)iy
f = ~
(yi)
is not submersive at
in
o f Y
Yi "
o_~n Y).
converging to some point
x E X
If we put x i = ~Xyi, y~ = fYi
and
45
x i' = fx i
then the tangent space to
Using the fact that
Tf
sends
T
X • Y
onto
Y'
at
yj) -
(xi'
Ty~g',
is
T
X • T , Y'. x.~ ~x! X' Yi i
a simple calculation shows that
Yi ( x, f)iy
T
X
fails to be submersive at
ker T
Yi
(~Y) ~ k e r
T
Yi
(fiX)
Yi
if and only if the linear map
is not onto : the relevant maps are displayed in
xi
the diagram
0 -~ ker Ty(flY)
) T Y
TxX XTx,X , Ty, Y'
y'
L\ 0
) ker Tx(fIX )
~
)
TxX
> Tx, X' .
Passing to a suhsequence we may assume that all spaces same dimension and converge to a proper subspace (ker Tyi(flY))
itself converges to
converges to ker Tx(flX), X T x (T) = S c ker Tx(flX ). ker Tx(flX) at
x.
we cannot have
T CTxN ,
S
Tyi~X[ker Tyi!flY)]
of
say.
TxX,
havel the
~hile the sequence
Necessarily
(ker Tx.(fIX)) I
and we obtain the proper inclusion X Since T x ~ is a retraction whose image contains ker Tx(flX ) _C T,
so
Y
is not Thom regular over
X
D
The main result of the section will be that we can (under suitable conditions) assign a tube to each stratum so that all relevant commutation relations are satisfied.
Let us first fix some notation to which we will stick throughout this
and the next two sections. Let
(A, A)
be a Whitney stratified subset of the smooth manifold
a = dim A (i.e. the maximal dimension of a stratum in we denote the union of all i-dimensional Mi
~tr~t~ in
is a smooth submanifold of N of dimension
i.
A). ~
by
For each Mj .
N ,
and let
i=0,1,..~, a
P y II.l.l)
Notice al~o ~n~t ~he
~i
each at8
46
locally finite unions of strata, so a commutation relation holds for a pair (M i, M j) X ~ M i,
if and only if it holds for all pairs of strata Y ~M j .
manifolds for
Mi
with
It will in fact turn out to be more convenient to work with the rather than with single strata whenever possible.
Next we put,
-I ~ a < ~ .< a , A ~a =
Note for later use that each A~
(X, Y)
are locally closed in
U i=~+1
A~
and
1
is a relatively closed subset of
A , again by (l.l.1).
Notice that the
filtration by dimension already used in Chapter I.
f : N -~ N'
A~
provide the
If, more generally,
is a Whitney stratified Subset of another smooth manifold stratifies a smooth map
and that the
A
N'
(A', A' )
such that
(A, A' )
then let us agree to use the same notation in
source and target but distinguish by a prime all symbols referring to the latter. (2. 5 )
Definition.
manifold each
N.
~,
Let
(A, A)
A tube system for
for
be a Whitney stratified subset of the smooth A
consists of one tube
i = 0, l, ..., a.
(CRy) hold;
furthermore all (CRp) are satisfied 9
i a (T)i=0
tube system
relations of type strata in
A
Let
f : A ~ A' 9
for
A
If
we call it controlled if
f : N ~ N' ( ,k~a' ,T "k=O
is controlled over
be smooth and let
is a t u b e system for
(T 'k)
if the
9
Ti
fX U fY C M 'k
for some
Note that in general "controlled over (unless, e.g. all strata of
A'
(A, A' ) A'
then a
satisfy all
(CRy) and (CRf) and if (CRp) holds for those pairs
with
(X, Y)
of
k. (T'k)"
does not imply "controlled"
have the same dimension).
We can now state the result announced above. (2. 6 ) map.
Theorem. Let
f : A-+ A'.
Le__~t N
and
N'
be smooth manifolds,
A ~ N , A' _c N', and supwose
(A, A' )
By putting
(Ti)
for
A
f : N -~ N'
(T 'k)
which is controlled over
N' = point we obtain
a smooth
is a Thorn stratification for
Then for each weakly controlled tube system
exists a tube system
at
We say that the tube system is weakly controlled
if all commutation relations of type
be a stratification of
T i = (E i , w i , p i , e% )
for
(T'k).
A'
there
47
(2.7) Proof
Corollary. of (2. G ).
Every Whitney stratification admits a controlled tube system.KS We proceed by double induction as follows:
already constructed a tube system (there is nothing to show for Ma
(Ti)
a = 0).
for
A a-I
which is controlled over
By Theorem (i. 6 ) we find a tube
satisfying condition (CRf) (with respect to the tubes
various commutation relations involving strata in We do this by downward induction on
a < a :
Aa
a = a - 1
that
(T i)
(T 'k)
restricted to
be complete, for
a = 0
(for
A aa-1
A
ei
we have
A a = Ma).
is also controlled over
a .
(T 'k)
If we can arrange
then the proof will
gives the result.
neighbourhood of i
~
in
Aa
is controlled over i e ,
and
N , and we denote the latter by
pi
as maps defined on
for
~ ~ i < a:
ITil.
ITil
Note
Let for each
i
Ei
with
a , Qi =
We p a r t i t i o n mapped by points
In order
is a diffeomorphiem of some neighbo~rhood of the zero section in
that we may consider u.
e , for a n X 'q s A'
IT'qlx'I
i
(in view of (I.I.i)
are strata such that (by continuity of
Qi(k, ~), f o i
= ~,k o f
fX cX'
then
f
maps
f) for
~ ~ i < a
and
0 ~< k ~ I t,
(5)
f o i
(6)
(~, 9 pi)
(7)
( i, f) : Qi(k ' g) ~ ~ 0 (N',x;)
integration
be the of
uke~e~i,t (where
" Uk~+t'61k
~ i , t ( y v) = ~ i ( Y V , t ) , ~ i , t ( x ' )
Now d e f i n e
The u s e o f Im(i)
!
!
r : (N ,Xo) § (N,Xo)
= ~i,t ~F
- ~i(x',t)
, s : (P',y~)
).
-~ ( P , y o )
by
r(x') = i -I o ~k,_Vk~ . . . o ~i _Vl(X' )
(where
v i = u i o~ ~ F(x') )
s(y')
(where
w.l = u.1 o~(y')
i-l,j
j-lo ~k,_Wk ~ ... ~ l , _ w l ( Y ' )
-1
makes s e n s e :
- (~ o F ) - l ( u o ) .
retractions
' F~
to
i,j
recall
that
And i t i s a l s o c l e a r
)
I m ( j ) = ~ - l c u O) , that
r,s
are respectively
.
Now for(x') .'I
= J
= f o i-I o ~k,_v k o ... o # i _v I (x') = j-I o F o ~k _Vk o ... o ~i _Vl
~
o...o~i vk
oFCx') = soF(x') ,-v I
(since wiCFCx')) = vi(x') ) and so
f o r = s o F , as required:
thus
(F,i,j)
is trivial.
Cx')
73
w (I.i)
Preliminaries, mostly algebraic
Definition The local ring
~,Xo
is the ring of functlon-germs
(N,Xo) § 9
(with
addition and multiplication defined pointwise). This ring has a maximal ideal (N,x o) § (m,o)
consisting of all germs
.
We shall write (1.2)
mN,xo
4 ' mN
for
% , X o ,mN,xo
when no confusion can arise.
Lemma Let
Then
(Xl,...,Xn)
x I ..... xn
be a system ~f local co-ordinates for
represent a (N-basis for
(N,xO) .
mN .
Proof Let
#
represent an element of ~(x) = r
mN .
Then
- r n
=
~ (r
.... O,x i ..... x n) - r
.... O,Xi+l,...,x n)}
i=l -
~ II ~ i=l 0
{%(O ..... O,txi,xi+ I ..... Xn)}.dt
i!ixill ~-~~xi (O,. " " '0'txi'xi+l" "" 'xn) }.dr O Thus the germ of X. WS 1
~
is indeed a Z-linear combination of the germs of the
,
Further, by taking differentials (giving a CN-linear homomorphism mN + T*Nxo ) we see at once that the dxi's (1.3)
xi's
must be linearly independent (since the
are); and so they do indeed form a basis. Definition Let
f : (N,xo) § (P,yo)
f* : ~ § CN
is defined by
Note that
f*mp c mN .
be a map-germ.
f*(~) = ~ o f .
Then a ring homomorphism
74
Now let us consider a situation which has already arisen in our study of unfoldings: (1.4)
Lemna Let
(u,u0) be a sequence of germs such that -I
_i., i
(V,v0)
~,
(W,w0) a submersion with
is an immersion and
(wO) = Ira(i) . Then the sequence
o § ~*(mw).C v = c v .i*, c U + o is exact and (non-canonically) split. Proof Let
(Wl,.,.,We)
(Vl,...,Vk,W 1
g,
o
be a system of local co-ordinates for
...,We o ~)
be a system of local co-ordinates for
a system exists because
is a submersion). -
mV NOW
i* : % +
%
(W,wO)
.C V
acts as follows:
i*(1) = I , i*(vj) = vj o i , i*(wj o w) . wj o w o i = 0 . Thus it is clear that for
(U,uO) , so, by (1.2), Hence
i*
(v I 9 i,...,VkO i) v l o i ..... v k o i
is a system of local co-ordinates form a basis for
mU .
is onto.
Also, clearly
Ker i* - <w I o ~,...,w e o w>.C v = w*(mw).C v , so that the
sequence is indeed exact. And of course the sequence is split via our choice of co-ordinates.
(1.5)
Now observe that
(Xl,...,xn) ~x---i..... ~
8N
is a free CN-mOdule of rank
is a system of local co-ordlnates for
= dim.N
(if
(N,Xo) , the vector fields
are a basis for it).
Now we define the CN-mOdule
%f , for any map-germ
to be the module of germs of vector fields along
f
f : (N,xO) § (P,y0) ,
(Chat is, germs
75
$ ; (N,Xo) + TP
such that the following diagram commutes; TP ~//~ (N,xo)/-
the CN-mOdule action is defined by free CN-module of rank for
= dlm, P
It is worth noting that
(1.6)
(if
A
is an R-module,
$ : A § B
~,8
all
8N
(1.7)
B
E
R, a,b
r
tf : 8N -> 8f over
an S-module, and $
if
8f
is a
is a system of local co-ordlnates f
along
f
81N .
defined by f*
are a basis for it).
tf(~) = Tf o ~ ; and
defined by
$ : R § S
wf(n) = ~ o f .
a ring homomorphism,
@(ca+ 8b) = $(e).$(a) +$(8).$(5)
then
for
A ),
We may interpret
sense~ elements of
It is clear that
is the same object as
wf : 8p + 8f
is a homomorphlsm over
);
(yl,...,yp)
~-~--~ylf'" "" , % o
There is a %-homomorphism
there is also a homomorphism
( ,Yo )
f
(~'$)x = Sx'$x '
(if
(P,yo) , the vector fields
~rojection
Bf
8f
as 'infinitesimal perturbations v of
are 'tangent vectors' at
specifying as they do for each tangent vector there.
x E N
how
f(x)
f
f : in some
in the space of germs,
is to be deformed by giving a
We should thus expect to he able to derive elements of
ef
from paths in the germ-space, which we do as follows:if
g : (N•
B E TUuo
Oxu0)
§ (p,yo)
is such that
there is a well-defined element
c : (~,O) § (U,Uo)
represents
f(x) = g(X,Uo)
8.g e 8f
B , define
defined as follows:
~,g(x) = d
is irmmedlate (by Taylor's theorem and differentiation
, then for each if
(g(x,c(t)))it= 0 ,
of products)
that
~.g
It is
well-defined. Such parametrized families of germs give rise to unfoldings F : (NxU,x OxuO)
§ (p xU,y O x u O )
of
f
by
F(x,u) - (g(x,u)~u)
it is worth noting that %,g = {iF(O,8 opN ) - wF(O,8o pe)}IN• (where we identify
8Nx U = ep N @ 8p u , 8p• U = 8pp 9 8p~ ).
, and vice versa;
76 Conversely, given an element of
8f , can we construct 'a parametrized family
of germs (and hence an unfolding) realising it?
(I. 8)
Lemma If
# l ' " ' ' # k ( Of , then there exists a germ g : (N•
such
As to this, we have:
that
g(x,O) = f(x)
and
-~ (P,yo)
8--~." g " ~i 1
(i = I ..... k).
Proof Let can write
(yl,o..,yp)
be a system of local co-ordinates for
r
. ( ~~
= j=l ~ r
g : (Nx~k,xoxO)
§ (P)yo)
o f)
(i=l ..... k) , where
r
(P,yo) . ~ ~
"
Then we
Now define
by k
Yi o g(x)u I ..... Uk) = Yi of(x) + Then clearly
(1.9)
g(x,O) = f(x) , and
~-~-." g = ~i i
~ u.~j,i(x) . j=l J
(i=l,...,k)
, as required.
Having introduced soma of the modules with which we will be concerned) as
well as indicating some of their relationship with unfoldings, we proceed to the theorems of module algebra which we will need.
(I.I0)
Lemma Let
such that Let
R
(Nakayama) be a commutative ring with identity) and let
1 + m c R* E
Then if
( R*
is the group of units of
m c R
be an ideal
R ).
be a flnitely-generated R-module. m.E = E , E - O .
Proof Suppose that
E + 0 ) so that, since
minimal spanning set {el,... ,ek} k el = j-l~x.j . ej , where x~ ~ m .
for Thus
E
E
is finitely-generated,
over
R .
Since mE = E ) we can write k x.e. and so, since (I - Xl).e I -j=2Jj
i - xI
is invertible)
there is a
k e I = [ (I - Xl)-ixj.e. j=2 3
P
'
77
So
eI
minimal.
is dependent on
Thus
(i. II)
e2,,..pe k
in contradiction to
{el,.,,,e k}
being
E = 0 ,
Corollary Let
A
SeA
be a finitely-generated R-module (R as in (i.i0)), and let
be a finite subset, Then spans
S
A/mA
generates over
A
over
R
if and only if the image of
S
in
A/mA
R/m .
Proof VOnly if':
If
Thus spans 'If':
S
generates
A
over
R , we have
R.S = A ,
(R/m).S ~ R.(S/mS) = A/mA , so that indeed the image of
A/mA
over
We have
A
in
A/mA
R/m . (R/m).S = A/mA , whence
A/R.S = m.(A/R.S) generates
S
.
over
Thus, by (I.i0)
A = m . A + R.S ,
A/R.S - 0 , or
so that
A ffi R.S .
Thus
S
R .
Remark Our use for (I.I0), (i. II) is precisely that conditions of (I.i0) (the inverse of (l+f)-l(x)
(1.12)
I + f , for
R ffi ~
f 9 mN
, m = mN
satisfy
the
is of course given by
= l/(l+f(x))).
Corollary Let
B
be a sub-module of a finitely-generated ~ - m o d u l e
A , and suppose
that
d i m ~ { A / ~ + I A + B} < r . Then
~ A c B .
Proof The n o n - d e c r e a s i n g
dimlR{A/A+B} consists of hypothesis.
r+2
sequence < ... < d l m ~ { A / ~
A+B}
non-negative integers, and is bounded above by
Hence there exists an integer
dim]R{A/~ A+B}
< ,.. _< d i m ~ { A / ~ + l A + B }
ffi d i m ~ { A / ~ + l A + B }
, whence
r , by
i , O -< i < r , such that 4
A+B
" 4+IA+B
9
78
"
Thus
"
i
(m~ A + B ) / B = (mN+IA+B)/B = mN . (mN A + B ) / B
(m.l~ A + B ) / B
= 0 .
Hence
~
a ~-module, if
then
a E A, ~ ~ ~
A
.
AcB
N
Now let us observe that if
, and s o , by ( 1 , 1 0 ) ,
f : (N,Xo) + (P,yo)
is a map-germ and if
may also be considered as a ~-module
, we define
~. a = f*(#) . a ).
us, in this situation, to find generators for
via
f*
A
is
(that is,
It will often be important for
A as a Cp-module.
As to this, we
have, firstly:
(1.13)
Theorem Let
(Malgrange)
f : (N,x O) § (P,yo)
~-module.
Then
d i m • {A/f* (rap)A}
A
be a map-germ, and let
is finitely-generated
A
as a ~-module
be a finltely-generated if and only if
is finite.
This may look like a theorem of algebra; in fact, however, it is a very deep result in analysis, first proved by Malgrange
(at the instigation of Thom).
Another, slightly easier, proof is due to Mather [MaIV].
We will not give a proof
here.
(1.14)
Corollary Let
subset.
A
be a finitely-generated
Then
A/(f*mp)A
S
spans
generates A/(f*mp)A
A
~-module,
and let
as a ~ - m o d u l e
over
S c A
be a finite
if and only if the image of
m(~/mp)
.
A/(f*mp).A
over
S
in
Proof W0nly if' : clear. 'If' :
If the image of
S
spans
is finite, so by (1.13)
A
is finitely-generated
by (i. Ii) that
(1.15)
S
generates
A
over
~
~
, then
dim]R{A/(f*mp)A}
as a Cp-module.
It then follows
.
Corollary Let
E
be a finitely-generated
generated sub-~-module
(via
f* ).
CN-mOdule , and let
EI c E
be a finitelyT
79
If E =E' f o r some
r > dim]R{E'/mpE'}
then
+ (f*~+~
r+l._ >~
E = E'
Proof The inclusion
Ev c E
induces a vector-space homomorphism
E'/~,E' which is onto by our hypothesis,
§ E/Cf*~ + ~+1)~ so that
di~/(f*mp So, ~ince
E
,
is a finitely-generated
+ ~I)E~
~ r .
CN-mOdule , it follows from (1.12) that
E c (f*.p).E . Thus the hypothesis may now be written E = E ' + (f*~)E So the vector-space homomorphism onto, and thus by (i.13)
E
EV/mpE v ~ E/(f*mp)E
is finitely-generated
But the reqrltten hypothesis also imPlies (1.10),
E/E' = 0 , or
.
E - E' .
induced by inclusion is
as a ~-module.
E/E v = (f*mp).(g/E v) .
So, by
80
w
Infinitesimal
Stabilit Z
In this section we state and prove an algebraic condition equivalent to stability, and derive various consequences.
(2.1)
The condition is:
Definition A map-germ
f : (N,x O) + (P,yo)
is infinitesimally
stable if
ef = tf(SN) + wf(Sp) (for notation see (1,5), (1.6)).
The main result of the section is:
(2.2)
Theorem A map-germ is stable if and only if it is infinitesimally
stable.
Proof 'Only if' : Let
Suppose
# ~ 8f , and let
g(x,O) = f(x)
and
( F , ~ x O,ip x O) be trivial: for
let
- soF Let
f : (N,x O) -~ (P,yo)
~
of r,s
g : (Nx~,Xo•
9 g = ~ f
by
is a stable map-germ. + (P,yo)
(as in (1.8)).
Then
f(x,u) = (glx,u),u)
be retractions to
be such that g
determines an unfolding
, which, since
~ • O, IF x 0
f
is stable, must
respectively such that
. ~ {s(y,u) }In--O ~ 8p . ~ = ~u (r(x,u)}Iu=O c e~, ~ - ~fu
the identity
f o r(x,u) = s(g(x,u),u)
tf(~) = # + wf(~) , so that
with respect to
~ E tf(SN) + wf(Sp)
Since this is true for any
~ ~ 8f ,
f
Differentiating
u , we obtain
.
is infinitesimally
stable.
Before proving the 'If v part of the theorem, it will be convenient for us to derive a consequence of infinitesimal stability relating to vector fields along unfoldings. Let
f : (N,x O) § (P,yo)
: (P',y~) -~ (U,u O) Let (where
d~
be a map-germ,
a submersion such that
8F, ~ - Ker{d~ : 8F + 8 oF} is defined by
d~(~) = T~o# ).
(F,i,j) ~l(uo)
an unfolding of
= Im(j) .
f , and
81
Then there is a ~,-module morpbism as a ~,-module via
i* ) defined by
u : 8F, ~ § 8f
~ § Tj -I o ~ o i
(where
8f
is considered
(this makes sense because
~(i(x))c Ker TwF(i(x) ) - Im(TJf(x)) ). Further, O § (~ o F)*m u . eF, ~ c eF, ~ ~
ef + O
is an exact sequence of %,-modules. (If
~ ~ 8f , then
dj o ~
Tj o ~ o i-I : (Im(i),x~) § TP' is a submanifold of germ
~'
Thus
a
Nv
is a vector field along is a vector field along
and
j o f = Fo i , so that FIIm(i) .
Since
Im(i)
Im(~) c Im Tj = Ker T~ , this may be extended to a
of vector field along
F
with
Im(~') c Ker T~ ; and then
a(~ ~) = ~ .
is onto.
Also,
Ker a = { ~
8F,~Idj-lo ~ o i = O} = oi
= {+~F,~I~oi = (Ker i*)eF, ~ But, by (1.4),
(Ear i * ) % , = (w o F)*mu. % , ; so the sequence is indeed exact).
Thus there is an isomorphism of %,-modules (a)
8f ~ 8F,~/(~ o F)*mu . 8F, W
Similarly (replacing
f
by
IN,I P
respectively), we have isomorphisma
(b) 8N ~ 8N, ~ o F / ( Z o F ) * m u. 8N, ~oF
(where
8N,,~oF = Ker t(~oF)
(c) 8p = 8p,,~/(Z*mu) . ep,,~
(where
ep,
(2.3)
)
= Ker t~ ).
Lemma If
f
is infinitesimally stable, then 8F, = tF(eN,,~oF) + wF(Sp,,~)
Proof It is easy to see that the morphism tF(SN, ~oF)
onto
tf(eN)
and
(F*mp,)eF, ~
~ : eF, ~ § Of
defined above maps
onto (f*mp)ef .
(~ o F)*mu " F*(~*mu) = F*mp, , we can deduce from
(a)
Hence, since
an isomorphism of
~,-modules (*)
8F,~/tF(eN,,woF) + (F*mpv)eF, ~ ~ 8f/tf(8N) + (f*mp)Sf
82
Since
f
is infinitesimally stable,
finite ~ - b a s i s some finite
for the
RHS
of
(*)
, so that a
is given by the projection of
wf(S)
, for
S c 8p .
By (c), isomorphism
S
is the projection of a finite set
(*) ,
wF(S')
must generate this % , - m o d u l e
@F, = tF(SN, ~ F )
S v c Spy ~ ; and then, by the
must project to an ~ - b a s i s
Thus, by (1.14) applied to the ~ , - m o d u l e wF(S')
8f = if(8 N) + wf(@p)
for the
8F, /tF(SN,,~oF)
as a ~ , - m o d u l e .
LHS
of
(*) ,
, the pzojeetion of
Certainly,
then,
+ wF(Sp, ~) .
Now we can give: Proof
of 'If' in (2.2) Let
f : (N,x O) + (P,yo)
any unfolding of
f .
be infinitesimally
To show that
f
stable, and let
(F,i,j)
is stable, we must show that
a trivial unfolding; by (0.6) it will suffice to construct,
for any
vector fields
and
(where
E 9 8N, , q 9 @p,
~ : (P',y~) § (U,u O)
such that
tF(E) = wF(n)
is a submersion such that
be
(F,i,j) T E 8U ,
t~(q) - w~(T)
~-l(u O) = Im(j)
, as
usual). So - let and
~
~ 9 8u , and let
respectively,
be lifts for
T
over
that is, T(~oF)
(Such lifts exist because Then
E 1 ~ 8NV,q I 9 8p~
o E 1 = ~. (~ oF) ,T~ o n I = T o
~ ~ F,~
are submersions).
T~ o nlO F - Tx o dFo E 1 = O , so wF(n I) - tF(E I) ( Ker dr = 8F, ~
Thus, by (2.3), there exist
E 2 9 8Nt,xoF , n 2 9 8p,,~
such that
wF(ql) - tF(~l) = wF(n2) + tF(E 2) 9 Define Then
E = E 1 + E2 , n = n I - n 2 .
tF($) = tF(EI) + t F ( E 2 ) =
wF(~l) - wF(N2) = wF(q)
t~(q) m t~(nl) - t~(q2) = r . ~ = w~(T) Thus
E,q
and
.
are the required vector fields, and the proof is complete.
z oF
is
83
(2.4)'
Let
space
f : (N,x O) § (P,yo)
be a map-germ, and let ~ f
be the JR-vector
8f/tf(8 N) + (f*mp)Of . Let
pf : 8p/mpOp §
be the ]R-homomorphism induced by
wf
(this is
wf(mpep) c (f*mp)Of),
well-defined since
Then: Corollary f
is stable if and only if
pf
is surjective,
Proof 'Only if' : clear. 'If' :
If
pf
is surjective, then
of - if(0 N ) + wf(Oe) + (f*mp) 0f . Then by (1.15) (with
E = Of , E' - tf(SN) + wf(Op) ) we have
8f = tf(SN) + wf(Sp) , so that
f
is infinitesimally stable, and hence, by
(2.2), s t a b l e . We want to go on from this to derive a condition under which a map-germ will possess a stable unfolding if
PF
(F,i,j).
Of course
F
is stable if and only
is surjective; we want to express this in terms of the module
8f .
As
a first step, we have
(2.5)
Lemma There is an ~ - l i n e a r isomorphism
q F , f : ~ f +~/F J
defined as follows: if
~ r Of , let
Then
~ ( OF
be such that
~o i = dj o ~ .
qF,f([~]) " E~] 9
Proof Let
~ : (P',y~) ~ (U,uO)
be a submersion such that
~'l(u O)
Ira(j)
Consider the ~,-module morphism
%F,~/tF(8N, ~oF) § 8F/tF(SN,) induced by the inclusion
8F, ~ c 8F .
f
This morphism i s i n j e c t i v e ,
because
o
84
8F, ~ n tF(SN,) = Ker d~ n Im tF = tF(ker t(~ oF)) = tF(0N, ~ F ) . On the other hand, we have
8F = 8F, ~ + tF(SN, )
of local co-ordinates at co-ordinates at
(for if
(Ul,...,u k)
(U,u O) , then we may choose a system of local
(P',y~) of form (yl~.,.pyp,Ul,~p,..,ukP~)
such that { ~ }
. L
8F .
is a system
spans
J
But d~(wF(~)
- tF(~(uj~oF )) = O
(j
so tha= also
{wF(~S--~)dyi, tF(~(Uj=S ~F))}
spans
8F ).
Thus the CN,-morphism is actually an isomorphism. an isomorphism of Cp,-modules (via
It is, therefore, also
F* ), and so gives rise to an ~-linear
isomorphism 8F,~/tF(eN,,~oF) + (F*mp,)SF, ~ % 8F/tF(eN,) + (F*mp,)8 F 9 Composing the inverse of this isomorphism with the isomorphism in (2.3), we obtain
(*)
a : 8F, ~ § 8f (2.6)
derived
qF,f "
The characterization of the action of the isomorphism
(*)
qF,f
follows from the definition of
of (2.31, this isomorphism being induced by the morphism
defined by
a(~) - dj -10 ~@ i .
We define the R-homomorphism PF,f : TP~y~ §
as the composite
-i Tp ~
, ~ 8p~/rvSpT~Fr~ YO
We have Le=~a
(F,i,j)
is a stable unfolding of
Proof Immediate from (2.4) and (2.5). This
leads
us
to
f
if and only if
0F, f
is surjective.
8S
(2.7)
Definition Let
f : (N,xO) § (P,yo)
Define
Xf = d i m ~ f
We say that (2.8)
f
be a map-germ,
e {O,I,2 .... ,|
.
is of finite singularity type (abbreviated FST) if
Xf < ~
Theorem f
has a stable unfolding if and only if
f
is of FST.
Proof 'Only if' :
If
(F,i,j)
so that certainly 'If' :
If
is a stable unfolding of
f , then
0F, f
is surjective,
Xf < dim PV .
k - Xf < ~ ~ let
g(x,O) = f(x) , and
{ ~
a
g : (N • ~ k ~ Xo • O) § (P~yo)
k " g}i=l
be such that
maps to an ]R-basis in ~ f
(such
g
exists
i
by (1.877. by
Then
g
determines an unfolding
(F,1 N • O,ip • O)
of
f p defined
F(x,u) = (g(x,u),u).
ha~e PF,f(~a----lyo 7 o u i = q~l.[wF(~a-~-Y]
We
~I
Also,
a
a-~7.9 g =
{ t F ( a ~.) - wF(~,~--)}IN.~.• O
1
1
au i {[au~" g]}
(see (1.7)), and so
1
[a_s So, since
@
~U i
a g2--pF,f(~---,yo7 .oui,
spans ~/f , it follows that
1
( F , ~ • O,Ip x O)
is a stable unfolding of
f .
PF,f
is surjective, so that
86
w
Versality
In this section w~ show the equivalence of versality and stability for unfoldings. In fact, the key result of this section is a uniqueness theorem: (3.1)
Theorem Any two stable unfoldings of the same dimension of a map-germ
f
are
isomorphic as unfoldings.
The main step in proving this is establishing a Vcontinuoust version of it, which is the following: (3.2)
Lemma
Suppose that the commutative diagram F
/ ix ii~
(JR ,I)
j • fIR
is a one-parameter family of stable unfoldings of a map-germ a e I Fa
(
I
is the unit interval [0,i]) the unfolding
is defined by
x0
(Fa,i,j)
(~,I)
of
f , where
(that is, there exist retractions
respectively such that the whole diagram
(N ' ,x~)
(N' : < ~ , x ~ •
Fo
~
__~F
(P' ,y~)
(p~ • 2 1 5
(*) i ~ l]R
(N • IR,x O• I) conanutes).
(that is, for each
F(x',a) = (Fa(x'),a) , is stable).
Then the family is trivial over to
f
(JR ,I~
.i • i N
' (p x IR,yo • I)
r,s
87
Proof
We will make the natural identifications eN'x~ ,x~Xa = epN ' 9 e .n..p,. o F
Opwx~, ,y6Xa (where, as usual
epp, @ e # ~
PN' : (N' x IR ,x6 x a) § (N' ,x6)
and similarly for
is the natural projection;
Pp, ).
We claim that to construct
aE
=
r,s
it will he sufficient to find, for each
I , {a = (~a'~u = ~:S~~
F) ( eN'•
,
rla = (na,~-~-uo ~]R ) ~ ep,x]R,y~X a
such that
~a
is a lift for
(p' x R 'Yo x a)
~a
over
Fa
is the germ-restriction
(where of
F a : (N t x ~ , x 6 x a) §
F ) , where
~ ,~ Ker(i x l~,)*OpN '
~a' E Ker(j x l]R)*Bpp @ ( na
is, of course, automatically a lift for
~
over
~
)
To see this, we proceed as follows:let
be flows for
~ba : ((N' x:]R) x :JR, (x6Xa)
x O) § (N' x ~ , x O'xa)
~a : ( (P' xIR) x m ,
x O) -+ (P' x m , Y o X a )
~a,na
representatives
for
x O'
[-~,r
x
[a,a+c]
Hence, since
x
I
0 = a 0 < ... < a
(YoXa)
respectively.
We may in fact suppose (via choice of
F,~a,~ a ) that
~a,~ a
YO' x [a,a+E]
x [-~,r
is compact and connected, such that
respectively,
for some
of
~ > O .
there exists an increasing sequence
Sa.,~a. are germs defined on neighhourhoods of 1 1 x O' x [ai,ai+l] x [ai-ai+l'ai+l-al] ' YO' x [ai,ai+l] x [ai-ai+l,ai+l-ai] respectively. e
= I
are germs defined on neighbourhoods
88
Then
r,s
may be defined by
(r(x',a i +t),O) = ~ao,ao_a I o ~al,al_a 2 o ... = ~a
a -a o ~al,ai~t (x~ ,ai + t) i-l' i~l i
(s(y''ai+t)'O) =
a -a i-l' i-i i
~ ~ao'ao-al
for
~ "'' ~ ao'ao~al
0 < t (P,yo) for
To see this, recall that if
is defined by
~ ~ 8U .
F(x,u) = (g(x,u),u)
Then (defining
g"
from
, then (as in (2.8)I F"
in the same way
90
as
g,g'
were defined from
F,F ~ ) we have
PF",f(80) = [-~'g"] = ~-h(8),g'~ = PF',f(h(~o)) = PF,f (~) and the claim is proved. Now let define
yl,...,y p
ga : ( N •
be a system of local co-ordinates for
O•
§ (P,yo)
(a ~ I)
by
Yi o ga(x,u ) = (I ~ a) 'Yi o g(x,u) + a,y i o g"(x,u) Then, defining clearly have
Fa : (NxU,xo•
§ (p•215
by
P a = (I + = . F ,f a)PF,f aPF",f PFpf
surjective, and hence so also is Now define the map-germ F(x,u,a) = (Fa(x,u),a) iNx U • O,ip• U x O
.
P a " F ,f
(P~yo) , and
Thus
(i=l,.,.,p)
.
Fa(x,u) = (ga(x,u),u) So in particular
Fa
P a F ,f
is stable for each
F : (N•
§ (PxUx~,YO
Then, by (3.2), there exist retractions
is
a ~ I .
• r,s
, we
by to
respectively such that the following diagram co=mutes :
(N• U,Xo• O )
~F
:
(p •
)
rT
Define
rI : (N•215
and define
sI : ( P x U , Y o •
Then clearly unfoldings, (3.3)
§ (NxU,xoXO)
r l(x,u) = r(x,u,l)
by
§ (PxU,Yo•
(rl,s I) : ( F " , ! N X O , I p •
by
,
sl(y,u) = s(y,u,l)
§ (F,INXO,Ip•
.
is an isomorphism of
and so the proof is complete.
Corollary Let
(F,i,j),(F',i',j')
dim.(F',i',j') Then
- dim.(F,i,j)
(F',i',j')
and
be stable unfoldings of
f
such that
= e Z O . (FxIRe,i•
•
are isomorphic unfoldings.
Proof By (3.1), we need only show that of
f .
(F x l~e ,i x O,j x O)
is a stable unfolding
91
Let
g : ~'x~e,x~•
-~ (P',y6)
(g(x',t),t) = ( F •
Then
be defined by
.
PF•
,F(~-t. I
) ffi [- 8-~ ~
1
" 0
(where
tI . . . . .
te
are the usual
1
YO xO co-ordinates
in
~e)
: (P'x~e,y6xO)
so that
PFxll~e ,F " PF o T~ , _ where YoXU '
§ (P ' ,yo) ,
is the natural projection.
Thus PFxlRe,f Hence, since (Fxl~e,ix0,j
ffi (qF,f)-I~
PF,f ' T~yo•
x0)
e ,F
are surjective,
= PF,f o T#YoX O . so is
is indeed a stable unfolding of
PFxl]R e,f
; and thus
f .
Now we can prove
(3.4)
Theorem An unfolding of
f
is versal if and only if it is stable.
Proof 'If' :
Suppose that
(F,i,j)
any other unfolding of since
X F, ffi Xf
(F",I,J)
.
(via
Then
Then, if
f . qF, f) ,
is a stable unfolding of Since
f
has a stable unfolding,
XF , < |
(F",loi',Joj')
f ; let
and so
F'
Xf < ~
be So,
has a stable unfolding,
is a stable unfolding of
e = Idim.(F",loi',Joj')
(FV,iV,j v)
- dim (F,i,j)I
say
f .
, we have, hy (3.3),
either an isomorphism (~,~) : ( F x l l ~ e , i x O , j
x0 ) ~ ( F " , l o i ' , j o j ' )
or an isomorphism (~,~) In the first case, (where
: (F,i,j) = ( F " X l ] R e , l o i ' x O , J o j ' x O )
((~oF) o ~ o l , # o ~ o J )
~ : (p' x R e ,y~ x O) + (p',y~)
second case, So
see that
is a morphism
(F'.i',j')§ (F,i,j).
is versal.
Suppose
(F,i,j)
(F',i',j') + (F,i,j)
is the natural projectlon); while in the
(~ o (IN," xO) o I , ~o (ip,,, xO) o j)
(F,i,j)
'Only if' :
is a morphism
.
(F,i,j)
is a versal unfolding of
f .
The nearest way to
is then a stable unfolding is via the naturality of
PF,f '
92
which we make explicit (3.5)
as follows
:
Sublemma Let x~)
(N
F
~,Xo)
+
f~. (p,yo)
*
-
be a m o r p h i s m Then
:
(r
~
(F,i,j) § (F',i',j')
PF,f " 9F',f
(p,y~)
(F",y~)
of unfoldings
of
f .
OT~y0
Proof Define an ~ - h o m o m o r p h i s m if
A' e 8 F,
A ~ e F ~ let
K([A])
= [A']
-I = qF,f
and let
A' ~ eF,
qF,,f[a]
= [A']
(for if
"
But
.
V r 0p,
as follows
§
A' o i' = Tr o A o
A' oi'
A ~ 8F
ffi V' o , o F o i
K ( [ V o F]) ffi [V' o F']
i .
Then define
be such that
- Tj' = a .
A' o i' = Tj' o a - T r , and let
:
for it is not hard to see that
a ( 8f , let
be such that
(V' oF') oi' so that
be such that
This well-defined,
.
-I qF',f o K
Now let
K :~F
V' ~ 0p,,
Then
oa=
ffi V' o j' o f
qF,f[a]
T~oAo
be such that
A o i = Tj o a - [A] ,
i , so
K([A])
V' o j ffi T r
ffi T ~ b o V o j o f
- T~o
,
=[A']).
j .
(VoF) oi
Then
,
, and thus
Now we return to the proof of :'Only if ~ in (3.4). Suppose not stable,
that
(F,i,j)
so that
PF,f
[el ~ Im(PF, f) , and let and ~uu" g, = a
(such
(F',iNXO,ipXO)
of
is a versal unfolding is not surjective.
g' : ( N x ~ , x o •
g' by
there exists a morphism
(r
F'(x,u)
f , and suppose that
Then let -~ (P,yo)
exists by (1.8)).
f
of
is
be such that
be such that
g'(x,O) f f ( x )
Then define an unfolding
= (g'(x,u),u)
: (F',INXO,ipxO)
a r
F
.
Since
-> (F,i,j)
(F,i,j)
is versal,
, and, by (3.5), we have
93
PF',f = PF,f =T~yOxO ' But
~F,,~(~I
) = E-
~. ~
~ [-~
YO xO Thus we have arrived at a contradiction;
so
, ~hi~h is not contained in
F
must be stable,
Im(PF, f)
94
w
Con=act-equivalence
Definition (4.1) Map-germs
fi : (Ni'xi) § (Pi'Yi)
germs of diffeomorphism
(i = 0,I)
are equivalent if there exist
h : (No,Xo) § (Nl,Xl) , k : (Po,Yo) § (Pl,Yl)
such that
fl o h = k o fo " Definition (4.2)
a)
A pair
(h,H)
consisting of germs of diffeomorphism
h : (No,X O) § (Nl,Xl) , H : (NO •
+ (N I x P l , x l x y l )
such that the following diagram commutes: INo• (No,x O) ~ - -
h
PN O ~ (NoXP0,xO•
~ (No,X O)
IN; Yl
(N l,x I)
PN1 ~ (N I • 2 1 5
)
(Nl,x I)
is a contact eRuivalence.
If
NO = NI'Po
=
P1 '
(h,H)
is a~-equivalence; i f also
h
=
~0
,
(h,H)
is a~ -equivalence. b)
Map-germs
f'l : (Ni'xi) ~ (Pi,Yi)
(respectively~-equivalent, (respectively~-equivalence,
(i = 0,I)
~-equivalent) C-equivalence)
are contact-equivalent
if there exists a contact-equivalence (h,H)
such that
(l,fl) o h = Ho (l,fo) . We have, of course, already used the notion of equivalence extensively - in particular, in w map-germ
f
that of
f .
we said heuristically that a versal parametrized unfolding of a
'contains' representatives of all 'nearby' equivalence classes to
Now, as we pointed out in w to a parametrized unfolding. w
any unfolding of
f
gives rise (non-uniquely)
In particular, then, a stable (equlvalentlyp from
versal) unfolding does so, but of course the parametrlzed unfolding so obtained
need not be versal in the category of parametrized unfoldings.
@5
However, what is true is that such a parametrized unfolding 'contains' representatives of all 'nearby' contact-equivalence classes to that of
f
- more
precisely, we should set up a category of parametrized unfoldings and Vcontactmorphisms' and show that in this category an unfolding is versal if and only if it is stable as a map-germ. That this is true seems as non-obvious as the equivalence of stability and versality for (non-parametrized) unfoldings, and it is equally difficult to offer any suggestion as to why it should be true other than a detailed proof of the type of those given in w 'contact-versality'
We shall not give such a proof here, since the notion of in this form is not very useful for the purposes of this book.
Instead, we shall obtain, in w parametrized unfolding of
f
a different version of the 'fact' that a
which is stable as a map-germ 'contains w all 'nearby'
contact-equivalence classes to that of
f , via a transversality theorem.
Instead, let us use the discussion above as motivation:
the close
relationship outlined here between equivalence and contact-equivalence in the presence of stability suggests the following : Theorem
(4.3)
Let where
FO,F I
fO fl The
be stable unfoldings of the same dimension of germs
fO,fl ,
are contact-equivalent.
FO,F I
are equivalent.
which has the important consequence~ Corollary (4.4) If
fO,fl
are contact-equivalent stable map-germs, then
fO fl
are
equivalent. Proof fO,fl
are zero-dimensional stable unfoldings of themselves; so the result
follows at once from (4.3). In order to prove the theorem, we will need to relate contact-equivalence to the algebra of vector fields which we have been using to study unfoldings.
The
96
connecting link is provided by " Lemm~
(4.5) f,f~ : (N~x-O) § (P,y0)
Map-germs
are ~-equivalent
if and only if
f*mp.C N = f'*mp.C N . Proof '0nly if' : (IN,H)
Suppose
such that Now
f,fv
are~-equivalent,
so that there exists a~-equivalence
(l,f') ~ IN - Ho (l,f) o
H(x,y 0) = (x,Y0)
for all
x e (N,x0)
(from the diagram of (4.2) a)),
H*(p~mp, ~ x e ) c p~mp~ CNx P .
so that But
H
is a diffeomorphism,
H*(p~mp, CNx P) = p~mp, % x p
so
H*
is an isomorphism,
and thus
"
So f'*mp.C N - (1 ,f ' )* (p~mp . CNxP) .CN = (1 , f ) * (H*p~mp . CNxP) ) .CN = (l,f)*(p~, Vlf':
Suppose Let
f*mp.C N - f V * m p . ~
Xlp...,x n
N
= f*mp.C N .
,
be a system of local co-ordinates at
system of I bcal co-ordinates at
(I
CN I
Suppnse
a I ..... a n
co-ordinates at
Thus, by (4.5),
(h-l) *
(l,fo) , so that provides the required
. ~ : CNO § C N L
is an isomorphism carrying
be local co-ordinates at
(Nl,X I) .
(N0,x0) , blp...~b n
Then we may write
~-l(b i) =
n ~ h..a. j~! ~J J
( i = I ..... n) .
fo*mp.CNo
local
to
98
Since
~
(and #-I)
are isomorphlsms, the matrix
invertible for
b = x0
and hence for
diffeomorphism
h : (No,Xo) + (Nl,Xl)
b
near
H b = [hij (b)]
is
x 0 , and so we may define a
by
n
b i ~ h = j~lhij.a.j Then
~-I = h* , so that
Thus by (4.5) So
fo,fl
fl 9 h,fo
(fl
(i = l,...,n)
9 h)*mpCNo
= f~mp.CNo ,
are~-equivalent.
are indeed contact-equivalent,
This leads to the geometrical result| (4.7)
Lemma Let
(Fk,ik,Jk)
(k= 0,I)
be unfoldings of the same dimension of map-germs
fk " Then
Fo,F I
are contact-equivalent
germs if and only if
fo,fl
are,
Proof First note that, via composing with a germ of diffeomorphism
' ' + (P{'Jl (~l),y~) , we may assu~e k : (P~,Jo(P#ty 6) (= P' say),
Po
m
~i (= F say), r~ = F 1 !
=
Jo = Jl (= j say).
Now let us observe that, in general, if
(F,i,j)
is an unfolding of
f ,
then
i*(F*~p,.%,) = (i*F*~,).%
(since i*%, =
= (f*j*mp,).C N = f*mp.C N
(since
%)
j*mp, = mp) .
Now for the proof : 'If' :
Let
SO certainly Let
h
(h,H)
be a contact-equivalence
(fl o h)*mp.CNo
=
(l,fl) o h = Ho (l,fo) ;
f~mp.CN 1
be a germ of diffeomorphism
o iO = i I o h .
such that
(NO',x0') § (Nl,Xl); '
such that
Then
i~E (FlO ~)*mp, .%~I = (fl o h)*mp.CNo
But Ker i~ c F ~ , .C~6
(for
m
f~mp.CNo
=
i~[F~mp; .CN~3 .
Ker i~ ~ F~(Ker j~)), and
so
99
h)*mp,.CN~= F~mp,.CN~
(FI" Thus
Fo,F 1 o h
'Only if' :
are~-equivalentp
Suppose
isomorphism
Fo,F I
: CNo § CNI
and so
.
Fo,F 1
are c o n t a c t - e q u i v a l e n t .
are contact-equivalent; so that there is an carrying
F~mp,.CN~
onto
F~mp,.eNl .
Let us first prove the result in the case where rank
(dfo)xo (= rank
(dfl)Xl) = O . In this case, Let
Ul,...,u k
9
2
Ker 15 - mN~
=
2
F~mp~,CN~ ~ mN~ ,
be local co-ordinates in N~
such that
Zm i 0 =
and such that they extend to a system of local co-ordinates at
w
{u l = . . .
=Uk=O}
u I ..... Uk,X l .... ,xn
,
(No,xO) 9 We may write (non-uniquely) 9
#(u i) = v i + a i , where
2
V i E Ker i~ , a i s F~mp,.CN~ n mNl. Then define a homomorphism
~v : CN~ + CN~
2'(ui
(i = I, ....k)
= vi
'(~j)
by
~(xj)
(j = i ..... n)
.
is the same as for
This is an isomorphism (for the induced map
0 "'0 "'I "'I into, hence onto, F~m~.CN! (for
) and it carries F~mp,.eN~ F~mp,CN{ ).
Moreover, it carries
Ker i~
onto
Ker i~ ; and thus induces an
isomorphism i~ (F~mp ,CN~) -+ i~ (F~mp,CNI) i.e. an isomorphism Thus
fo,fl
f~mp.CNo
f~mp.CNl
are contact-equivalent.
Now let us consider the case where rank let
(Po,Yo)
(dfo)xo
be a submanlfold-germ of
such that
fo
70 : (No,Xo) + (Po,Yo)
is transverse to
O
at
xO ; also,
~0 : NO + NO'30 : PO § P
PO "
he the restriction of N
rank
(P,yo)
(dfo)xo (= rank
(df l)xl) > 0 :
of codimension equal to rank Let fo "
NO = fol(Po) ; and let Clearly, then,
TO
is of
N
(fo,io,Jo)
is an unfolding of 70
are the inclusions), as also is
(where (Fo,io o io,Jo o ~O ) .
100
Similarly, we can construct fl
and
fl : (Nl'Xl) § (PI'Yl)
which is unfolded by
FI .
Then, since analysis,
Fo,F I
are contact-equivalent, so are
Hence, by the Vlf" part of the lenmm,
fo,fl , by the foregoing are contact-equlvalent.
fo,fl
Now, to connect with our algebra of vector fields, we have:
(4.s)
L~,,ma Let
(h,H)
be a~-equivalence between map-germs
e(h,H ) : 8f -~ 8f~ dHo (O,~) o h -I Then
f,f~ ; and let
be the CN-mOdule isomorphism defined by (9 ~ 8f)
e(h,H )
(where we identify
(O,e(h,H)~) =
8(l,f ) - 8N 9 8f) .
induces an ~ - v e c t o r space isomorphism E(h,H ) : ~ f §
(where ~/f = 0fTtf(S N) + f*mp.0f ) . Proof We may write H' = (h- l • r
e(h,H )
as the composite
e(h,h•
) o e(IN,H,) , where
o H , and so it is sufficient to show that each of
~(h,hx~)
is well-defined. First, then, the case We have Thus
H = h • Ip .
f' = f o h "I , e(h,h• ) _
e(h,hXlp)(f*mp,Sf) = (h
Also, if
= wh "I . )*f*mp.Sf, = fV*mp. Sf, .
~ c ON , then wh'l(tf(~)) = wh " I o T f ' o dho ~ = Tf' o dho ~ o h -I = tf'(Tho ~ o h "l) .
Thus
e(h,hXlp)(tf(SN)) = tf'(SN) . So
E (h,h•
is indeed well-deflned.
Now let us consider the case By (4.5),
h = 1N .
f*mp.C N = f'*mp.C N , so that, since
restriction of the homomorphlsm
dH : 8(l,f ) § S(l,f,)
e(1,H ) (f*mp.ef) = f'*mp.ef,
e(1,H) over
is just a H* , we have
'
101
Also, if
~ 9 8N , then
(O,e(l,H)(tf(6))
= dH(O,Tf o 6) = THo T(l,f)o 6 - THo (6,0).0 (l,f) = T(l,f')
Now
o 6 - T}{o (6,0 ) o (l,f)
THo (6,0) o (l,f) = (~,~) , where
H(x,y O) = (X,Yo)
for all
Thus we have
.
~ 9 f'*mp.Sf.,
, because
x ( (N,xO) .
e(l,H)(tf(6))
= tf'(~) + ~ , and so we have shown
e(l,H)(tf(SN) ) c tf'(SN) + f'*mp. Sf . Thus, also,
e(l,H)
is well-defined,
We can now give Proof of Theorem (4.3) First of all, let us observe that it is sufficient to consider the case rk(df O
~
germs
ffi rk(df
) = O (for as in Le.~na (4.7), fO,fl are unfoldings of rank I f~O,~l which, by that le~mm are contact-equivalent since fO fl are~
and of course
FO,F I
are stable unfoldings of
~O,~I ),
Next, let us remark that it is sufficient to consider the case when are~-equivalent, all
y 9
(for if
with the~-equivalence
between them such that
fO,fl
H(xo~Y ) = y
for
(P,yo)
(l,f I) oh = Ho (l,f O) , then
(I,
(HxO).l
x o fl o h) = (h-l,h -I• (H O)'l)oHo(l,f) xO
(where
H xO : (Po,Yo) -> (Pl,Yl)
replace
fl
is defined by
by the equivalent germ
and also replace
FI
(y) = H(xo,Y))
, so that we can
(HXo) -I o fl o h , which is ~-equivalent
to
fO ,
~-I k o F I = h , where
by an equivalent germ
: (No,Xo) ' I) ' , k : (Po,Yo) ' ' § (Pl,Yl) ' ' § (Nl,X ' ,
that
H
are germs of diffeomorphism such
ho i0 = i I o h , k o J0 = Jl = HxO ) " Let us also observe that, by Theorem (3.1), it will be enough to show that
any stable unfolding of
f0
(of the relevant dimension,
any stable unfolding of
fl
of dimension
Now, in general, if (pF,f)-l~f (For
q 9 8F
(F,i,j)
k
say) is equivalent to
k .
is any unfolding of a map-germ
f , we have
= Im TFx~ is such that
qy6 9 Im TFx~$r--~there exists
6 9 8N,
such that
102
wF(q) - tF(~) 9 mN,.OF~=~DF(qy~)
9 mN,~F
~===>pF,f(ny~) = (qF,f)-ipF(DYo) 9 Also, we have d f Sop since
F
= mN~ f + [wf(Te)] , and
is a stable unfolding
surjective (by (2.6)), it follows that of
F
of
mN.)~F
).
[wf(TP)] = pF,f(Im(Tjyo) ) .
f
if and only if
PF,f
is
is stable if and only if the restriction
PF,f PF,f ; Im TFx~ + m N f
is surjective. Now let us consider our ~equivalent 0
at
fO,fl , which are of rank
map-germs
x0 . Let
U
be a neighbourhood of
be a map-germ
s.t.
gO(x,O) = fO(x)
0
in
~k
, and let gO ; (NxU,x O x O ) +
and such that
{[~.o gO~}
span
(P,yo)
m N ~f
1
(Such fO
gO
exists by (1.9); it is possible to span
does have a stable unfolding of dimension
Then the germ
F 0 : (NxU,x0xO)
is a stable unfolding of Now let (where
fO
-> (PxU,YoXO)
~ 'g i e(l,H)(-~-" gO) = ~-~-. 1
F I : (NxU,xoXO)
§ (PxU,YoXO)
stable unfolding of germs.
fO
fl .
k
elements~ since
(and hence rank
k
x 0f
at
).
FO(x,u) = (gO (x,u) ,u)
(9
~
o
PFo,fo ~Uily xO ) = -[~--~i" g ] )"
be defined by
is the C-equivalence between
gl(x,O) = fl(x) , and
with
defined by
(for, as in (2.8),
gl : (NXU,x OxO) + (P,yo)
(IN,H)
k
~f
and
(x,g (x,u))
H(x,g (x,u))
fl ) ; then clearly Thus, if we define
1
by
FI(x,u) = (gl(x,u),u)
Thus it remains to show that
, then
FO,F I
FI
is a
are equivalent
This we will do by showing that they are part of an (~,I)-family of
stable germs trivial over Let
{Xl, .... x n}
{Yl .... 'YP} Define
(IR,I) .
be a system of local co-ordinates at
be a system of local co-ordinates at F a : (NxU,xoxO)
-> (PxU,Yo•
(P,yo) . (a E (1%,1))
I Yi ~ Fa = (l-a).Yi o F 0 + a.y i o F I u i o F a = u.l
(N,xO) , and let
by
103
so
that
Fa
is an unfolding of Yi
Indeed
9
fa : (N,Xo) § (p,yo)
=
fa
a fO
(l-a) "Yi
(l,f a) = H ao (l,f O) , where
defined by ~
+ a.Yi
Ha : ( N x P , x o X Y o )
fl
'
+ (Nxp,x OxyO)
is defined
by X. oHa = X. 1 1 Yi~ H a = (l-a)y io INx P + ay i , H so
that
(IN,Ha)
Of course
is a~-equivalenee. Fa
is of the form
Fa(x,u) = (ga(x,u),u) , where
a
0
yiog and clearly we have
= (l-a)Yiog
i
+ a.Yiog
@ B a e(l,H a)(8-~." gO) = 8~. " g 1
1
Hence
PFa,fa(.~_il~
YoXO
) = _[ Bu.' 3..~_ ga] = _[e(1,Ha )(~u3. . gO)] z
z
= E(l,Ha)~FO,fO(8~ilYoX O) " Thus
~Fa,f a
Now let
is surjective, so that
G : (NxU•
G(x,u,a) = (Fa(x,u),a) .
OxOxl)
Fa
§ (PxU•
We aim to show that
is, that there exist retractions
r,s
is a stable unfolding of
to
•215 G
fa .
be defined by
is trivial over
iNx U • O , Ipx U x O
(]l,l) ; that
respectively such
that the diagram F0 (NxU,xoXO)
--
~ (PxU,YoXO)
rl
Ts G
(NxUx ~ , x 0 x
~ ~ (PxUx~,Yo
xOxl)
F,
(~ ,I) commutes. germs
rI
If we show this, then of
(N•
OxO)
, sI
sl(y,u) = s(y,u,l) , so that
F I = s I o F O o (rl) -I , where the diffeomorphismof
FO,F I
(PxU,y O•
are given by
will indeed be eqdivalent.
As in (3.2), to construct the desired retractions to
find, for each
a E (~ ,I)
'
rl(x,u) =r(x,u,l),
elements
r,s
it will he sufficient
~a' ~ .* ,n 8" * " ~NxlT'NxU rNxU , ~'a s PpxUmNxU 8pp• U
104 such that
~a = (~" ~ = ~ ,
(Here
G a)
Ga : (N•215
restriction of
is a lift for
O•215
over
~a = (qa'~u , 2 =~
§ (P•215
•215
Ca
is the germ-
G ; and we have identified
eNxUxB=
e
9 e
PNxU
Ga
~o
,
ePxUx~=
e
PpxU
e ev
),
To do this, we proceed as follows: Ca = tGa(0'~" ~R~ Ga) " WGa(0'~~ ~
let
) "
P
Then
~a = i~IP~• Now
Fa
Ha x l U x l U )
~ FI - Yi ~ F0)'wGa(~-~-o~yiPP•
is ~-equivalent to
F0
O) .
(the~-equivalence being (essentially)
, so that = F0*mpxu.CNxu
Fa*mp• Thus
0
Ga*P~Ump•
= P ~ x U F *mpxu'CN•215
Yi o F I s FI*-
Now
C
~PxU" NxU
= F 0.-
C
mpxu" NxU "
So
* u(Yi ~ F I - Yi ~ FO) ~ P~ PN~
UFO*~PxU" CNxUx~ = Ga*P~ x l~p•215215
and thus Ca ~ Ga*P~ x umpxu'SGa,~ ' Now, by (2.3), we have eGa,~ ~
= tGa(eNxUx~,~
oG a) + WGa(epxuxl~, ~
)
so that Ga*P~,~ ump•
m c tGa(P~ •215
~R~ Ga ) + WGa(P~ x Dmpxu'Sp•
W]R )
Hence, via the natural identifications OPNxu we can f i n d
~1~ ~ Ga
PP•
~av E p ~ x UmNxU. ePNx U , qa, ~ p~•
such that So, since
ONxU•
U
Ca = tGa(~"O) - WGa(na,O) . Ca = tGa(O'~u~ w~OGa) - wG a ( O , ~ o ~R) , we have
wGaCnl,~o~> ~a = (~a'~u ~ ~ )
so that over
a ' !~u ~a ~ ~t~' o
~
o
%)
tG a(~a,~o w~1~
is indeed a lift ~or
G a , as required, and the proof is complete.
=
105
w
Determinacy
We now turn our attention to the question of whether a map germ is equivalent (or contact-equivalent) to a polynomial. (5.1)
Definition Map-germs
f,f! : (N,Xo) ~ (P,yo)
are r-jet equivalent if
r+l
(f* - f * ' l m p c m N
This is clearly an equivalence relation; we call the equivalence class of j rf .
A more usual definition of r-jet, in terms of partial derivatives, is equivalent to that given above, as is shown in the following: (5.2)
Le~mm Let Then
f,f' : (N,xO) + (P,y0) jrf ffi jrf,
be map-germs.
if and only if the partial derivatives of
f
and
f'
(with
respect to some, and hence any, systems of local co-ordinates) agree for all orders _< r .
To prove this, we will require, first
(5.3)
Sublen~a Let
~ E CN,xo .
Then
~ ~ ~+I
if and only if all partial derivatives of
# , with respect to any system of local co-ordinates for
(N,xO) , of orders
~ r
vanish. Proof Let If
Xl,...,x n
be a system of local co-ordinates for
(N,xO) ,
r = 0 , the result holds (by definition!).
Otherwise let us assume inductively that the result holds for jets of order < r ~ If
r+l # ~ mN , then
generate
m N , by (1.2)).
I ~i'xi , with i=l
~i E ~
(since
Xl, .... x n
By our inductive hypothesis, then, the partial
#i
vanish for all orders
xi.#i , and so
, vanish for orders
derivatives of of
n
=
-< r - I -< r
, so that the partial derivatives (differentiation of products').
106 Conversely, let
if the partial derivatives of
be the function defined by
~i
~i (x) =
~ =
~(0,... ,Xi+l,... ,x ) n
~ ~i.xi . i=l
r ~i e m N ;
~i
Jl ~~x (0,.
"''txi'xi+l"' "
Now
_< r ,
,,Xn).dt
"
xi.~i(x) = ~(0, .... x i .... ,Xn) -
so that, since the partial derivatices of
vanish, so do those of derivatives of
vanish for all orders
0
n
Then (as in (1.2))
#
xi.~i(x)
.
~
for orders
Then it is easy to see that the partial
must vanish for orders
_< r - I ; so by our inductive hypothesis
r+l ~ E mN
whence
So the inductive step, and hence the proof, is complete.
Now we have Proof of (5.2) All partial derivatives of same is true for
vo f,vo f'
f,f'
for any
of orders
~ r
agree if and only if the
v E mp ; which, by (5.1), is true if and
r+l vo f - v o f, = (f* - f,*)(v) ~ m N
only if
for any
v ~ mp .
We can derive further consequences of jet-equivalence as follows: yl,...,y P
8f
and
(5.4)
(P, yo) .
be a system of local co-ordlnates at
wf(~),...,wf(~y~) 8fv
is a free basis for
8f
let
Then
as a CN-mOdule.
We will identify
wf(~y~) ~-+ wf'(~y~.) .
in the following l~r,~ by
Lemma Let
f,fv : (N,Xo) + (p,yo)
be such that
jrf = jrf, .
Then
a)
tf'(ON) c tf(SN) + ~ S f
f'*mpOf,
b)
r§
c (f*mp + m N
)Of .
Proof
a)
s
x I,.. 9 ,xn
Then, since
be a system of local co-ordinates at
8Xl"'''~-~n
(N,x O) .
is a free basis for the CN-mOdule
n
write
Thus
= i[=l i'~x i tf(
(~i E C N) )
-
n1 % t i-i
< r
for any
f(~
~ ( ON 9
" I 1
1,3
~x~(f* (yj)).wf (~y~) i
8 N , we can
107
and so Since
tf'(~) = tf(~) + z,j'~'~i~x~-~.(fV*(yj ) I f,f'
have the same r-jet, all partial derivatives of
orders
~ r
orders
s r-I
vanish, and so all partial derivatives of
So, by ( 5 . 1 ) , b)
Since
- f*(yj)).wf(~y~.) . fV*(yj) - f*(yj)
~x~-~.(f'*(yj) - f*(yj)) 1
of of
vanish,
~--~-(f*(yj) 1 f,f'
- f'*(yj))
E ml~ , and thus
tf'(~)
- tf(~)
~ m~T8f .
r+l f'*mp c f*mp + m N , and the result
have the same r-jet,
follows at once.
45.5)
Definition A map-germ
f : (N,Xo) § (P,yo)
isF~-determined by its r-~et (respectively
determined by its r-jet) if every map-germ jrf = jrf,
f' : (N,Xo) + (P,yo)
is~Mu-equlvalent (respectively equivalent) to
Thus, if
f
such that
f .
is determined by its r-jet, it is equivalent to a rather
particular polynomial - its Taylor series (with respect to any local co-ordinates) truncated after order
r .
However, determinacy is rather hard to calculate; but
for stable map-germs can clearly be arrived at via~i~-determinacy (using (4.4)), for which we now give a sufficient condition: (5.6)
Theorem Let
f : (N,xO) § (P,yo)
be a map-germ such that
~ Sf r Then
f
tf(6 N) + f*mpSf .
is~-determined by its (r+l)-jet.
Proof Let
fv : (N,xO) § (P,yo)
Let
(yl,...,yp)
define
be a map-germ such that
be a system of local co-ordinates at
fa : (N,Xo) + (p,yo)
y : (N•
g : (Nx~,XoXl) Xo•
+ fN•
(P,yo) .
by
Yi~ fa = (l-a).y io f + a,y io f' Then define
jr+If = jr+If,
+ (P,yo) Xo•215
by by
(i=l .... ,p)
g(x,a) = fa(x) , and y(x,a) = (x,g(x,a),a) .
For
a ~ ~,
108
We aim to find retractions
the
r,$
1NX O,INx Px
to
0
respectively such that
following diagram commutes:
(N,xo)
(1,f)
,l
(Nx~,XoXI)..~
Y
,
(Nx P'Xo Y O ) sx ]
and
Let
(rl,s I)
between
ga : (N•215
"
O) , defined by
f
and
gp7
(for
rl(x) = r(x,l)
sl(xpy) = S(x,y,l) , give a
fv , and the proof will be complete,
"~ (P'Yo) 'Ta ~ ( N • 2 1 5
be the germ-restrictions of
(~ixO)
) (Nx~,XoXT)
r I ; (Npx O) § (NpXo) , defined by
sl : ( N x P , X o X Y O) § ( N x P , x o •
~-equivalence
PN• ....
) (Nxpx~,XoXYoXl)
'~ (1% 1) If we can do so, then
~
-> ( N • 2 1 5 2 1 5
a ~ I ) .
We shall identify, in the natural way, 0
-O
Ya
@O
PN
8NxPx]~.,X o X Y o X a
@0
ga
=
~
OpN @ OPP 8 0~]R
ONx~, XoXa - Op~l @ Or~ (where
pN,p P
(N,Xo),(P,y O)
(N •
are the natural projections of respectively, and
p~
(N x p x R, x 0 x YO x a)
to
is the natural projection
XoXa) § (N,Xo)). By similar arguments to those of (3.2), for the construction of
possible it will be sufficient to find, for each ' ~ mNmpSpe =
PN•
such that over
~a
to he
a r I , elements
(E~,~8~o ~ )
is a lift for
Ya
With respect to the system of local co-ordinates P
(yl,...,yp)
+a = i=ll (#a).Wgla (~-~'~i'--)oy (~a)i c CNxR, XOXa and it is easy to calculate that
r,s
, we can write
109
(@a) i = Y i d fv . Y i ~
r+2 c Nx~t
~ mN
~a E _r+2 mN 8ga "
so that Now We claim that
~ mNrega ~ tga(SNx~' %_.
+ g*mp'Sga .
To see this, we argue as follows : from the hypothesis of the theorem, we have ~ S f c tf(SN) + f*mp.Sf . Since
jr+ira = jr+If ,
(*)
it follows, by applying (5.4), that mNr8 fa c tfa(SN ) + (fa*mp + mNr+l)Sfa
Now recall (from (2.2)) that there are natural isomorphisms 8ga/m~ , aSg a ~ 8fa (ga gives rise in the obvious way to an unfolding identify
8ga with
8F
w ' where
~
Fa
of
is the projection
(px~,YoXa)
a,
0NxIR' ~ / m R ,
aeNxi~., ~ . ~
fa , and we can § (~,a))
ON .
So from (*) we can deduce mNr 8ga c tga(SNx~, w~) + g*amp.Sg a +ranr+l 8ga ' Thus it follows from (I.i0) that the CN-mOdule (via { ~ 8 ga + tga(eN•
' w~) + g*~.8 ga }/{tga(eNx~, ,~) + ga*mp.Sga} = O '
and the claim follows. It certainly follows, then, that
~a ~ tga(mNONxP., ~ R ) + mN~ so that there exist such that
~'a ~ mNSNx~, ~ , , n"a ~ mN'g*mp'eg a ~a = tga(~av) + ~'' " a
We will, as usual, identify
~.'~ mNeNxm, ~,~
a
8Nx~, ~
with (~',o> ~ ep~ |
%~.
with
8p~ , and so identify
110 7a
Now
qa' o Ya = q''a "
such that
na
1lit for
is an immersion, so, since
(Ea
=
ga = PP o Ya ' there exists
It remains to show, then, that
, 8 ~ P N x R 'qa'~u = wl~ ) over
n~ c mNmp8pp
~a = (~a'~u ~
7a :
We have TU~
=
~ PNx
tga( O
'
= ( C o PN~m'
tga(C)
~a' ~ ~
+
= (~a" PNxl~' qa '~u
~m )
~m ) = na =7a
and so the proof is complete,
(5.7)
Corollary If
f
is of
FST , then
f
is ~-determined by its
(Xf + l)~jet.
Proof By hypothesis,
~ Sf
Xf = dim~{ef/tf(SN)
+ f*mp. Sf} = r < ~ .
c tf(ON) + f*mp.8f , and so, by (5.6),
(5.8)
f
Thus, by (i.12),
is~-determined by
jr+If .
Corollary If
f
is determined by its
(p + 1)-jet
is stable, then
f
is stable, then
pf : TPy 0 + 8f/tf(eN) + f*mp,0f
(where
p = dim. P ). Proof If that
f
dim~{Sf/tf(SN) Now let
f'
Thus, by (1.12),
+ f*mp. Sf} ~ p .
jp+If, = jp+If .
be such that
is surjective, so
~Sf
c tf(8N) +f*mp.8f .
Then, by (5.4), we can conclude
that tf'(SN) + f'*mp.ef, ~ tf(O N) + f*mp.8f so that A/f,~, But then
can be identified. pf,pf,
can be identified (since these are induced respectively by
wf,wf' , and our identifications are given by
wf(~--~.) +-+ wf'(~-~) ), so that vJ i.
is also surjective, and hence
f'
But, by (5.6), it follows that (4.4),
f'
~
is stable.
is actually equivalent to
f'
is~-equivalent to
f .
f , so that, by
P f,
111
w
Jet-spaces and a transver~ali~y
theorem
In this section we will obtain the 'contact-transversality'
theorem
advertised in w First of all, however, we will require some material on jet-spaces. (6.1) germs
The set
jr(N,P)
(for any integer
(N,x) + (P,y) , for any
x E N , y ~ P.
There is an obvious projection function assigning for
(x,y)
r ~ I) consists of all r-jets of
pr,O : jr(N,p ) § N • P
to any map-germ
(N,x) ~ (P,y) .
induced by the We write
jr(N,P)xo
(pr'O)-l{xo} x {pO} , and
jr(N,P) x PY (or jr) for (pr,O)'l{xo} x {yo} . 0 There are also projections pr,S : J~(N,P) ~ jS(N,P) (IN s N r ) given by
pr,S(jrf) = jsf . jr(N,P) pr'S(o ~ s ~ r)
is topologized as a smooth manifold~
in such a way that the
are projections of smooth fibre-bundles,
by giving the following
local charts: if
(Xl,... ,Xn)
neighbourhood
U
of
is a system of local co-ordinates defined on a xO
in
N ~ and if
co-ordinates defined on a neighhourhood where
i=l,...,n
, j m l , .... p
I -< c I + ... + on ~ r 0 E jr(N,P)xo,Y 0
and
(where
(pr'O)-iu x V , where, if f : ( N, x) §
and
(YI'''" 'YP) V
of
YO
k--l,...,p,o
is a system of local
in P , then = (al,...,a n)
(Xi,Y j ,Zk, O) , with
o i >- 0 , is a system of local co-ordinates at 0
is the r-jet of the constant germ) defined on z E (pr'O)-Iu • V
is the r-jet of a germ
(P,y) , then Xi(z) - xi(x) Y'3(z) = yj(y) 01§ ,, '+~ Zk,o (z) "
k o f)
Ol ~x I
on 9 9 .~x
n
(That these functions are well-defined follows from (5.21 ; that they form a system of local co-ordinates becomes clear by considering germs of polynomial mappings).
112
(6.2)
In fact~ we can be rather more exact about the fibre-bundle structure
involved: let us write
jr(n,p)
the group of r-jets at
0
jr (n,p)
jr(~n
Lr(n) c jr(n,n)
~P)o,o ' and let
(~n ,0)
of germs of diffeomorphlsm of
multiplication defined by on
for
jrh.jrh' = jr(h - h v) ).
(with
L r(n) x L r(p)
Then
be
acts
..rh ,3.rk.) = Jr( k ~ f o h -1) . jrf.(3
by
(To see that this action, and the multiplications in
Lr(n),Lr(p)
are well-defined,
we observe the general fact that the r-jet of a composite depends only on the r-jets of its constituents; for suppose that
f~f~ : (X,Xo) § (Y,yo)
same r-jet, and that
also have the same r-jet.
g,g' : (Y,yo) + (Z,zO)
(gof)*
SO that, since
- (g, of,)* = f*o (g*-g'*)
(g*-g'*)C z c ~ + I
r+l c mx , so that
g ~ f , g' o fv
+ (f*-f'*)
, (f*- f'*)Cy c ~ + I
, (
(go f),. (g, = f,),Cz
have the same r-jet). jr~N,P)x0pY 0
jr(n,p) ; clearly different choices correspond to the action of
Lr(n) • Lr(p)
on
jr(n,p) , and so
fibre bundle with fibre
(6.3)
Then
og'*
Now a choice of local co-ordinates provides an isomorphism of with
have the
If
jr(n,p)
and structure group
f : (N,xO) + (P,yo)
jrf : (N,Xo) + (jr(N,p), jrf) is a representative of
f
pr,O : jr(N,p ) + N • P
Lr(n) x Lr(p) .
is a map~germ, then a germ
is defined by the assignment
and
may be viewed as a
f
is its germ at
x ,
.i-2. x --+ j fx ' where Clearly
jrf
is a germ
X
of section for the projection
(6.4)
PN o pr,O : jr(N,p ) § N .
L er~ma Let
f : (N,xO) § (P,yo)
be a map-germ, and let
x = jrf
i
There are natural identifications (as ~ - v e c t o r spaces) a)
T(jr(N,P)xo) z ~- 8 flm " Nr+l 8f .
b)
T(jr(N,P)xo,Yo) z ~ ~N -- 8 flmN " r+l 8f .
Proof a)
Let
that
g(x,O) = f(x)
~ ~ 8f , and let
g : (N x ~ ,
and ~ u " g = ~
x 0 x O) + (P,yo)
(as in (1.8)).
be a map-germ such
Then the germ of path
113 u -~ jr(g~ element
(where
gU : (N,Xo) § (p,yo)
~ ~ T(jr(N,P)xo) z
gU(x) = f ( x )
9 -linear;
; which is determined by
+ u ~u 3g (x,O) + O(u 2)
Thus we can define and
r(r
where {yl,...,yp}
is defined by
r
= 0
gU(x) = (x,u)) gives an
r , since
(with respect to a n y local co-ordinates).
: 8f § T(jr(N,P)xo) z if and only if 3.rr
are local co-ordinates in
by
= O
r § ~ . (where
This is clearly P r = [ r i=l
P ) i.e. by (5.3), if and only if
r+l
, ~ m N 0f. So
r
induces an injection in
a); but
N Of T(jr(N,P)xo) z , 8f/m " r+l
the same l~-dimension, so this induced map is surjective also.
have
It gives our
identification.
b) This follows at once, by restricting r to T(jr(N,P)xo,Yo) z c T(jr(N,P)xo) z .
(6.5) a)
Corollary
Let
(yl,...,yp)
he a system of local co-ordinates for
This induces a local trlvialisation of induces a splitting
jr(N,P)xo
over
(P,yo) (P,yo) , and hence
T(jr(N,P)xo) z ~ T(jr(N,P)xo,Yo) z @ TPy 0 , which, with respect
to the identification of (6.4), is given by ~r(sf)- ~r(mNSf) @ Ig .
b)
Let
(Xl,... ,xn)
be a system of local co-ordinates at
This induces a local trivialisation of induces a splitting Let
over
(N,Xo) , and hence
T(jr(N,P)) z = T(jr(N,P)xo) z @ TNxo
f : (N,xO) + (P,yo)
above,
jr(N,P)
(N,Xo) -
be a map-germ.
rctfc ))l '
3
With respect to the splitting
~
,
Proof a)
The splitting via local trivialisation is given by translations in
while the map-germs
g : (N•
-> (P,yo)
g(x,u) = f(x) + (O, .. . ,u,.. . ,O) translations on
f ,
Since
(i=l,. ,. ,p)
~u" g = wf(
.
defined by
give the action of these , the result follows.
P ;
114
b)
This is a straightforward calculation. Let
$i(x,u)
#i : (N • ~ ,x0 • O) § (N,Xo) = x + (O,...,u,...,O)
by the translation flow given by
(i=l,...,n)
.
T(JrOxo ( lxi O) = r(jrf)xo d
.r
d
.r
Then
(xo'u lug)
~u(Jf~(x0,u))[u=0 -I
=~-ju(J (z~
d ..r(f
-I
,u))~(Xo,U))lu=O-Tu u
)
~
,u))xo ]u=O
(by the chain rule) The second term in the last expression is
-~r(tf(- ~x~.)) . Now, with 1 (,u) has the same Taylor series f o ~-I
respect to the chosen local co-ordlnates, at
~(Xo,U )
as
f
has at
x 0 ; so that
jrfx 0 § jr(f o ~(i u))~(Xo,U )
translation with respect to the local trlvialization by
is just
(0,...,u,...,0) .
Thus
indeed, with respect to the local trivialization splitting, T(jrf)xo(~[x0)
(6.6)
= (r(tf(~),~,Xo)
"
Now let us see how the notion of ~requivalence gives rise to a group-
action on
jr .
Let ~
be the group of germs of diffeomorphism of
multiplication given by composition).
/~ acts on germs
(N,xO)
(with
f s (N,Xo) § (P,y0)
by
f.h = f o h "I Let
~
( N x P , x o X Y O)
be the subgroup of the group of germs of diffeomorphism of whose elements
diffeomorphism-germ terminology on w by
H
are of the form
(P,yo) § (P,y0) H
for each
is a ~-equlvalence).
H(x,y) = (X,~x(y))
x ~ (N,xO) .
with
~
~ acts on germs
= ~ , . ~ (semi-direct product).
f : (N,xO) § (P,yo) H o (iN,f o h -1) .
by
f : (N,xO) -~ (P,y0)
Thus, in the terminology of w
-equivalence between ~-equivalence
between
This acts on germs
f.(h.H) = (f.h).H , that is, by
(~,f.(h.H)) =
(h,Ho (hx Ip))
f
and
f. (h.H) ; and similarly if
f
and
f' , then
a
(thus, in the
(1N,f.H) = H o (IN,f) . Now let
Hx
is a
(h,}{) is a
f' = f.(h,Ho (h-lxlp)).
115
Now let I~ r c jr(N,N)x0,Xo multlplicatlon defined by
be the group of r-jets of elements of ~,
jrh.jrh' = jr(h o h') ).
~r
acts on
jr
(with
by
jrf.jr h = jr(f .h) . Also, let ~ r c Jr(N x P,N x P)xoXYo~XoXY 0 of
~
.
~r
acts on
jr
by
be the group of r-jets of elements
jrf.jrH = jr(f.H) .
Finally, let 1- n ,
c f*mp
component
:
r+l +...+Xnrp§
by polynomials
r W c , each of which,
dim. (prc'r)'Ic , that is, of greater I~RK r' = c r each irreducible component c '
. r+l r+l ~x I ,...,x n ,0,...,0)
f(xl' .... Xn) =
that
if
of
than some irreducible
z' ~ (pr''r)-Iz
I(
generated
than
components
it will clearly be enough to find
We proceed as follows let
Thus,
codimension
w~'
codim.
Finally, z ~ Wr
c
.
j = 1 .
122
Let us write
Y~" = Yi - Yi-i
for
i=2,,.. ,p .
With respect to the
co-ordinates
(yl,yl, ..,,yp) , f has the form , r+l r+l r+l r+l r+l - x~+I ) f(x I ..... x n) = ~xI +.., +Xk+ I ..... Xk+i+ l - x i ,...,x n (where we write
First consider the case Let
q
be such that
k = n - p ).
i ~ i ~ k + i .
(q-l)(k+l)
+ i i).
It follows that
has regular intersections relative
((JIF)-IAt(N • T, P • T)) F
are transverse to
N x Itl
This proves (ii) as well as the last statement.
(ii) implies (i) uses (1.7, i => li)
F
and for
The proof that
and is left to the reader.
A little more than the hypotheses of (3.4) is needed to ensure that the family
Ift~tE T
(3.5)
is topologically trivial.
Corollary (to (3.3), (3.4) and (I, 5.8))
Keep the notations of (3,4) a n d
assume that one of the conditions (3.4 - i, ii) ~hat
F
Suppose moreover
is proper and that there exists a proper smooth function
that the restriction of the composite ((Jtft)-IAe(N'-- P))ft
~ oft
is transverse to
and homeomorphisms
: N ~ ~
~ c I~
trivial family of mappings, i.e. for any t E T
is satisfied,
Then
@
t E T,
h : N x U-~ N x U,
$ : P ~ I~
such
to any stratum of F
defines a locall2
there exist a neighbourhood
h' : p x U-* P x U
U
of
such that the
diagram below commutes F
N•
NxU
)
P•
~
PxU
ft x idU
In particular I a~v
ft' (t' E U)
Observe that if ~(P) = 189 9 F
P
is topologically equivalent to
is compact such a
The existence of ,
at infinity in case
P
~
always exists;
ft" we simply let
is postulated in order to have some control on
is not compact.
145
Proof F
Let
(At, A~)
respectively,
N • It'l
AIN x It'l
innocent refinement of
any intersection if we let
@
(A, A' )
X ~ (N • It'J ;
and
19-~Z ,
position and hence so are B = A ~ (~ o N T o F)-l@ F
HT
then and
~T o F
(~ o ~
X E A, t' E T . X E A, of
A
I~
and
o F)-l~ Hence
is transverse
HT o F
maps
T .
Now,
whose strata are the connected ($ o ~
o F)-I@
.
The pair ~ (B,
maps the strata of B'.
are in regular
We put
B
B') Thom
submersively 9o
Moreover each stratum of
Since
~-l[n, n + l]
to the closure of any stratum of F
is transverse to
submersively to
(~ o NT)-l@ .
$-l[n, n + I] • T.
the restriction of
A
Our aim is to let an
B' = 4' ~ (* o N ~ - l @
B'
T, HT~ B'
is
is compact, the
is proper.
to the closure of any stratum of
B
As
F
is
is also
Hence the hypotheses of ~I, 5.8) are satisfied for the diagram (N x T, B)
The result follows from (11,5.8)
w
F
(p • T, B,) ~T and
f : N ~ P
summarised by (3.5).
.
(11,5.9).
~
sufficiently large) any proper smooth
which is multi-transverse
topologically stable. stability theorem.
T
Topological stability as a transversality property
We now aim to prove that (for mapping
At .
imply that
does the same with the strata of
restriction of
proper.
A' and
and since
contained in a subset
proper,
~
X F] (~ o Np o F) -1 2Z ,
~
Then by (3.4)
of ft' and
satisfy the hypotheses of the Second Isotopy
denote the stratification
components of
stratifies
denote the Thom stratifications
corresponds with
The assumptions regarding
to each intersection
$ o NT
(A, A')
obtained by applying (3.3).
and
Lemma.
and
with respect to
AI(N, P)
is
In view of (1, l) this will imply the topological The progress we have made so far in this direction is best With an application of this last result in mind the
following proposition must be crucial.
146
(4.1)
Proposition.
transverse with respect to an open subset
f : N-+ P
The proper smooth mappings
O~(N,
P)
AI(N, P) of
which are multi-
J~f(N) n W l(N, P) = r
and satisfy
form
C~(N, P).
The proof requires a bit of preparation in the form of lemmas (4.2) and (4.3) below. (4.2)
Le__~t f ~ Coo(N, P)
Lemma.
cO
and let
[fj e Coo(N, P)l j= 1
converge to
f.
Then a subse~uence of
Ifj ~ embeds in a one-parameter family, more precisel.z ~
there exists .a family
IFt : N-* P~tem
IF1/k]k--I Oo
is smooth and Proof.
of mappings such that
respect to this metric and do the same for metric
p~
on
Jr(N, P)
for which
as a submanifold of
first factor. Vp
P • P,
N
In particular~
such that
N
P .
Jl(N, P)
We choose a tube in the sense of P • P
Ifj l~__l.
is a subsequence of
Choose a Riemannian metric for
(x, t) b~ Ft(x )
-- f.
F~
is complete with
These determine for every
t
is complete.
(II, 1.4, 1.5) for the diagonal of
compatible with the projection onto the
This exists by (II, 1.6).
The tube furnishes us a neighbourhood
of the diagonal together with a smooth mapping
F : Vp • [0, 1] * P
such
that Y(YI' Y2' 0) --Yl and ~(Yl' Y2' I) = y2 Ifj (k )1oo k=l
We now select a subsequence
of
Ifjloo j=l
such that
supI~t(Jfj(k)(X), Jbf(x)) : x ~ N1 < k -k2 and (fj(~+1)(x), fj(k)(X)) E V~ for all
x e N.
(-~o, 0]
Let
o : I~ -* [0, l]
and equals I on [i, co).
be a smooth function which vanishes on
Then define
g(x, t) = w(fj(k+l)(X), fj(k)(X), a(t + 1 - k)) g(x, t) = f(x)
if
t < 0.
with the property that
Then
g
is a smooth
suplp~(Jgt(x),
g : N x I~ if
(x, 0) . (t / O)
extends smoothly over
It follows that the family and
Fo(X) = f(x)
P
Coo-mapping on
J~f(x)) : x e N I < k -k2
N x m
We use (4.2) to prove the following
and N x (I~\[01)
if
Itl > k .
(x, t) ~ g(x, t -1)
by giving it the value
IFt}tel~ defined by
is as required.
by
t ~ [k - l, k]
We leave it to the reader to deduce that the mapping N x (SR k 101)
a
f(x)
on in
Ft(x) = g(x, t-1)
147 (4.3)
Lemma.
the set
Let
O K of
A~(N, ?)
f E
.,
~t
(N, P)
f' E ~(N, P)
with
is a neighbourhood of
Proof.
Suppose not.
As
and let
f
K
f'If-lK
f
[fj E Coo(N, P)Ij= I
always refers to a neighbourhood of
a
subsequenoe of
an
multi-transverse with respect to
converging to
A~(H, P).
f-IK
in
there exists a smooth one-parameter family Ifj 1~176
-
Then
has a countable neighbourhood basis there
is not multi-transverse with respect to
{Fl/klk_ I
P.
i_.nn C~176 P).
oo
then exists a sequence
be a compact subse t of
f
such that
fjlf-IK
(As usual, such a condition
N.)
By the previous lemma (L~.2)
IF t : N -* ]~ItEl~
with
F~ = f
and
It follows from (3.2) that there exists
j=l"
E > o
such that
Following (3.2),
JIF
is transverse to
N x IO~
is transverse to
intersection coincides with
~ ,
f ,
at
K • [-~, ~].
Since
and their
(Jtf)-lA~(N, P)
it follows from (1.7) that for a possibly
(J~F)-IA~(N • 3,
intersections relative
P x 3)
(Jg)-IAt(N • I~, P x 2)
(Jlf)-lA~(N, P) x IOl 9
has regular intersections relative smaller positive
A~(N • 2,
P • 2) I F-I(K • [-e, ~])
has regular
F , and that the strata of
AK, e = (JeF)-IA~(N x I~, P • 2) I F-I(K x [-e, ~])F are transverse to
N • I0J .
we may then choose t E [-e, r to
AK, ~
so small that
for all
t e [-e, r
is a Whitney stratification by (3.3),
N • ItJ
Then (1.7) implies that
At(N, P)
I t = ~
~
Since
FtlF;IK
.
is transverse to
AK, r
for all
is multi-transverse with respect
In particular this is so for
-I k > ~ , which contradicts our assumption.
if
Proof of (4. i).
Let
f E O~(N, P).
Choose a pair
{Vi cWil
of iEl
locally finite coverings of ~i c W.
for all
i E I.
P
by relatively compact open subsets for which
The set
D
of
f'E Coo(N, P)
with
Jf'(N)~Wt(N,P)=~
i
and
f, (f-I ~i ) c W i
any
f' E 0
AlE I O~i
is proper.
(O~i
intersection
for all
i E I
is clearly open.
On the other hand it follows from (4.3) that
as there defined) is a neighbourhood of
0 ~ NiE I ~ i
By the last condition
is a neighbourhood of
f.
f .
Hence their
It is clear that this
148
intersection is contained in
Of(N, p).
(4.4)
Theorem.
Any
f E Or(N, P)
is topolg~ically stable.
(4.5)
Corollary.
(The Topological Stabili~ Theorem)
The topologically
C_oo_(N, P)
stable mappings intersect the set of proper smooth mappings
in a
9r
dense subset. Proof.
In view of (4.4) it suffices to show that
Coo (N, P) pr
for some
e
codim We(n~ p) > n.
By (III, 7o 2)
The density of
(1.1) once we have show that codimension
> n .
Of(N, P)
W e (N, P)
Je(n, p)
canonical stratification. structural group
there exists an in
Lt(n) x L~(p)
Proof of (4.4).
of
Y(YI' Y2' I) = Y2 " P)
(III, 7.1).
Recall that
of the Jet-bundle Wt(N, P)
Jl(N, P) -~ N x P
into strata of codimension
F : Vp x [0,I] -~ P Now let
a stratification
~ c ~.
N. = ($ o f)-iIj ~ and if f'j : ~.'-*jPj
Vp
close to
f ,
then
(4, 4')
For any
for
f .
j E Z~ we put
f' E C~176 P)
neighbourhood of
Nj
enables us to compare
onto
is close to Nj,
then
Nj , ~l~j'
$
Note that
so if
> n .
P x P
~(YI' Y2' 0) = Yl
Let
$ : P-* I~
be
to any stratum of
4'
P. = $-IIj~ , 0 = ($ o f')-IIj I and let
we set f'.
and so
Then (3.3) constructs out
It follows from (3.4) that ~.' ~
is a
of the diagonal in
such that
f E ~e(N, P).
denote the restriction of
compact submanifolds.
Wt(n, p)
Hence it admits by (I, 2.7) a
a proper smooth function such that the restriction of is transverse to
will follow from
By choosing a tube for the diagonal in
and a smooth mapping
(Jls
such that
admits a stratification into strata of
we obtain (as in the proof of (4.2)) a neighbourhood
and
is dense in
This stratification is then invariant under the
determines a stratification of
P x P
l
~pr(N, P)
This is easily done as follows.
semi-algebraic subset of
D ~(N, P)
N.0 and
P.j are
fj E D~(Nj, Pj). ~
If
f'
is
is a smooth retraction of a
will be a diffeomorphism.
f' with f . Then (4.1) applied to f J 0 yields a neighbourhood Of of f such that f' E Of implies
and
This f. (j ~ 2Z), J
149
(a)
For any t ~ [0, IS , the mappi~
f~ E C~(N, P),
defined by
f~(x) ~ ~(f(x), f'(x), t), belongs to ~(N, P). (b) and
The composite ~ oft' is transverse to ~ c 9 for any t E [0, IS f, f~,j E n2(Mj t, Pj) for any j E ~ . We prove that any f' E Qf is
topologically equivalent to (Jef~)-IA~(N, P)
f .
According to (3.3) property (a) implies that
determines a stratification
(At, A~)
and property (b) above it follows that the strata of A~ manifolds stratum of f'
Pj, At
J s 2~,
of
f~.
are transverse to the
in particular, that the restriction of
is transverse to
are topologically equivalent.
~.
From (3.4)
$
ft
I~ then follows from (3.5) that
to any f
and
Referenees
[Bo ]
Borel~ A.
Linear Algebraic Groups, W.A. Benjamin, Inc. New York, 1 969.
[B=]
~,
,a
.
Brocker I T. & Jamch~ K.
Einf~hrung in die Differential topologie.
Springer - Verlag, 1 973.
[Gi ]
Gibson. C.G,
Regularity of the Segre Stratification,
Math. ~roo.
Camb. Phil. Soc. (To appear)
[Go ]
@olubits~1 M. & Guillemin I V.
Stable Mappings and their Singularities,
Springer - Verlag, 1 973.
[Hi ]
Hironaka, H t
"Number Theory, algebraic geometry and commutative algebra".
Volume in honour of Y. Akizuki.
Published
by Kinokuniya, Tokyo, 1973.
[~o]
Lan~. S.
Differential Manifolds,
~o~asiewicz I S~
Ensembles Sumi-Analytiques,
Looi.~enga, E.J.N.
Structural Stability of Smooth Families of functions.
[Ma]
Addison-Wesley,
1 972.
IHES Lecture Notes, 1965. C~ -
Thesis, University of Amsterdam, 1974.
Morlet, C~
Seminaire H. Caftan, Expos~ 4, 1961-62.
Mather t J. N~
I. Notes on Topological Stability, Lecture Notes, Harvard University, 1 970~ II. Stratifications and Mappings, Proceedings of the Dynamical Systems Conference, Salvador, Brazil, July, 1 971, Academic Press. III. Finitely-determined map germs.
Publ. Math.
IHES 35 (i968) p p . i 2 7 - i 5 6 . IV. Classification of Stable Germs by
9
algebras.
Publ. Math. IHES 37 (1969) pp.223-248. V. Transversality.
Advances in Mathematics 4 (1970)
pp.301 - 336. VI. The Nice Dimensions.
Proc. Liverpool
Singularities Symposium I, Springer Lecture Notes in Maths. 192 (1971).
151
[Th]
Thorn,R.
Propri~tes Diff~rentielles Locales aes Ensembles Analytiques, Seminaire Bourbaki, 1964/5. exp. 28i.
[Wa]
Wall, C.T.C.
Regular Stratifications. Warwick 1974".
'~ynamical Systems -
Springer Lecture Notes in Math.
No. ~68, P.332-344.
[Wa]
Wass erman, C-.
Stability of Unfol~ings, Springer Lecture Notes in Mathematics, 393 (i974).
[~]
vait~,, ~.
I. Local Properties of Analytic Varieties, pp.205244 in Differential an~ Combinatorial Topolo~, Princeton, i 965. II. Tangents to an Analytic Variety, Annals. of Maths.
8~ (~ 965), ~-% - ~ 9 .
Index
associated Thom stratification
28
bad set
~9
canonical partial stratification
26
canonical Thom stratification
32
canonical Whitney stratification
16
cl-equivalent mappings cl-stable mapping
I I
codimension
134
commutation relations
42
compatible tube
38
contact equivalence
94
control conditions
50
controlled vector field
36
controlled vector field
50
cross-ratio example
41
determined map-germ
307
diagonal stratification
127
dimension
18,68
distance function
38
equivalent map-germs
94
filtration by dimension finite singularity type
9,15,46 (FST)
Frontier Condition general position Genericity Condition generic subset
85 17 12,13,125 25 127
germ
37
induced stratification
13
infinitesimally stable map-germ
8O
ISS
Isotopy Lemma, First
4,59
Isotopy Lemma, Second
4,62
integrable vector field r-jet equivalent germs
54 105 5O
lift Local Finiteness Condition
9
local ring
73
local trivialisation
58
locally trivial stratification
59
locally trivial stratified set
58
minimal partial stratification
26
minimal Whitney stratification
15
multi-transverse mapping
5,127
Nakayama's Lemma
77
partial stratification
26
pinch map
24
Preparation Theorem of Malgrange
78
product stratification
12
refinement
14
retraction
38
regular point
18
regular intersection
14
restriction semialgebraic
126
set
17
singular point
19
singular set
19
special representative
134
spray
39
stable map-germ
69
154
9,22
stratification stratified vector field
9
stratum Tarski-Seidenberg
50
Theorem
17
Thom mapping
23
Thom Regularity Condition
23
Thom regular strata
23
Thom stratification
4,23
Thom
(Whitney stratification)
jet space topological equivalence Topological Stability Theorem topologically trivial family
5,131 2 148 3
transverse mapping
13
trivial stratified set
58
trivial unfolding
68
tube
38
tube system
46
tube system, controlled
46
unfolding
66,67
versal unfolding
67,69
Whitney regular strata
10,11
Whitney regularity Whitney Regularity Condition
3 11
Whitney stratification
4,11
Whitney stratified set
11
Whitney's Theorem
19
Whitney topology
127
Whitney umbrella
9
Symbols A, A, A' w A' a, a' B(X,Y) (CR.), (CRp), (CRf) CN,x O' mN, Xor C N, m N f, f X jr(N,P) jr(n,p) jrf jrf L r (n) Mi,M ,i pr,S Qi, Qi(k,l). Qpi
46 45,46 19 42 73 112 111 112 112 105 112 45,46 111 47,48
Sg(f)
3O
ITil
47 75 50,51 2O
tf VF., VFp, VFf, VFpf W(A,B)
W r (n,p) wf xf A1 (N,P) 8f C Dr K Nf R
120 75 85 134 126 94,114 127 94,114 83 114
Xc
17
(U.V)
128
R I(N,P)
146 70
eN,x o, e N ef
74