0047-2468/84/020178-0551~50+0.20/0
Journal of G e o m e t r y Voi.22 (1984)
2-DESIGNS
Johannes
9 1984 B i r k h ~ u ...
16 downloads
404 Views
211KB Size
Report
This content was uploaded by our users and we assume good faith they have the permission to share this book. If you own the copyright to this book and it is wrongfully on our website, we offer a simple DMCA procedure to remove your content from our site. Start by pressing the button below!
Report copyright / DMCA form
0047-2468/84/020178-0551~50+0.20/0
Journal of G e o m e t r y Voi.22 (1984)
2-DESIGNS
Johannes
9 1984 B i r k h ~ u s e r Verlag~
AND A DIFFERENTIAL
Basel
EQUATION
Siemens
We show that 2-designs with given parameters v~k~J~ are in one-to-one c o r r e s p o n d e n c e to polynomials that solve a certain differential equation and have coefficients equal to zero or one~ From this result we derive an existence theorem w h e r e b y designs correspond to integer points on a sphere in E u c l i d e a n Space.
Let
D
be a design on the point
with parameters termined
2-(v,k,%)
variables
for some field
in the polynomial
R
For a block Pb =
and we represent
the design
where the sum expands shall show that More important
PD
set
X = (x10x 2 .... ~x v}
.We shall regard these points b
H xi~b D
ring in
as in
the monomial I)
by the polynomial
of
D .In this note we
a certain differential
is the fact that the solutions
that are polynomials
= R[Xl,X 2 ..... Xv]
we define
x. m
over all blocks satisfies
R[X]
D
as unde-
(2) represent
equation.
of this equation
all designs
on
X
these parameters. On
R[X] we define =
the d i f f e r e n t i a l
~/~x I
+ ~/~x 2
operator
+ .,. + ~/~x v
(3)
with
Siemons
179
When its powers
8
i
are applied
~i(P b) : i! 9 [ where
the sum expands
b .For
i h k
xjl-xj2
over all
the right hand
i = k ) and as 0 inner product by
and
Q
Using
equation
9
in the remaining
are monomials (4)
obtain
P # Q P = Q
~2
PD
be the symmetric
(7)
xi.x j
is independent
satisfies
R[X]m
denote
by monomials
2-(v,k,~) P
an
I
xi,x. in b J
(6)
xi,x j
we
with
of degree
i ~ j
2 , i.e.
The value
of the particular
(k-2)!
the linear m
of
pair
1
~2
is
in equa-
xi,x j .Therefore
9 ~ 9 ~2 " solutions
subspace
variables
of
0
is a or
where
that
(0,1)-polynomial and
1
the
"block"
(8) one concludes
of this equation. that is spanned
in the first power P
in
P = PD
R[X]k,
for some design
D
has parameters
are the values
in equation
Xl.X 2.
( with
...-x k,
b = {Xl,X2,...,Xk,} easily that
solves
, i.e. all its coefficients
I .We shall also show that k
(8)
R[X]
appearing
.We shall demonstrate P
we define and
(7)
9
polynomial
For each monomial (4)
equal to
the pair
that for some k" a polynomial
(8)
provided
are either
in
containing
we now consider
in any
.Suppose
equation D
we define
the equation
Conversely
only
(if
(5)
if the pair is contained otherwise
(k-2)!
~k-2(P D) =
Let
i!
that
blocks
, x l..xJ.> =
the sum over all tion
R[X]
as
the equation < 8k-2(PD)
Let
1
of the block
is defined
.In
if
, xi'x~j >=
are exactly
subsets
(4)
if
0 As there
obtain
(~)
with coefficient
we observe
in (1)we
.X.jk_i
case
i (k-2)[ < 8k-2(P b)
.
9
side of
{~ P
o
(k-i)-element
< P ' Q >= when
to the monomials
(8)
coefficient
I )
. From equation
k = k" so that every
180
$iemons
block contains
exactly
x i 9x.J
product
b 2 ..... bs
k
appears
points
p r e c i s e l y in
be all blocks
Ps
be the corresponding
(6)
,we obtain
.We now have to show ~~ha~ ~ any
containing
and also as a consequence
, xi'x"
J
'
i = s
tic of
is zero or at least
= X
I:
for every pair
equation
' P2 '''
according
k-1
to
(9)
(8) >= < ~k-2(p)
xi,x j
The class of all designs
~k-2(p)
P1
bI
, x. ox~ > = i
~ 9 (k-2)! provided
J
(10)
the characteris-
.Under the latter
condition
on the point
(x !,~
the proof of
with parameters
to the class of
P .Let
and let
P .Then,
02 , xi.x j >=
Therefore
THEOREM
of
, xi.x. >= J
< ~k-2(P1+P2+o " +pz)
R
in
of equation
9 (k-2)!-
= < P , ~(a 2) > = w(P).I/2.k! .Hence elements in K have weight zero and any solution of equation (8) has weight w(P)
If
P
=
< ak
is an integer
, ak>
point
=
in
~.v(v-1)/k(k-1]
Z+
then
(12)
< P , P > > w(P)
.Hence
m
, P-a~
< P-a
v-2 -I. ~+ < P , P > - 2.< P , ak >.(k_2)
> =
v-2 i w(P).(1 - 2(k_2)-I.~) = r
2
.This
point
shows that
.Now observe
coefficients < P-a~
, P-a~
of
Z+~B(ak,r)
that
P
v-2)-2 + (k-2 " 12 "(kv) = w(P) " (I
w(P)
are either
> = r2
design with parameters
does not contain
= < P , P > 0
or
if and only if v,k,l
v-2)-I. (~-2
~)
any integer
if and only if the
I .Therefore P
< a~ , a~ >
,by theorem I,
is the polynomial
.This completes
the proof
of a
182
Siemons
We conclude with a remark on automorphism groups ~ symmetric group on transformations .As
X
acts on 8
and
~2
symmetric group also acts on elements in
R[X]k Z
as a group of linear
are permutation invariant ~the and in particular on the
Z .Therefore the orbits of
in
Z+N S(O~,r)
on
X
[0,1)-
(0,1)-elements contained
correspond to the isomorphism classes of designs
with given parameters .The automorphism group of a design
thus is the stabilizer of the corresponding integer point .So,if a design with given parameters should exist,we find a% least v!/d integer points in
p
~+~ S(Ok~r)
where
d
is the order of the au-
tomorphism group of the design.
REFERENCES [1]
F.Fricker, EinfGhrung in die Gitterpunktlehre, Birkhiuser Verlag; Basel,Boston,Stuttgart. 1982.
[2]
L.G.Ha~ijan, A polynomial algorithm in linear programming, Soviet Math. Dokl. Vol. 20, No.I, 191-19~. 1979.
[3]
J.Siemons, On 9artitions and permutation groups on unordered sets, Arch. Math. Vol. 38~ 391-403. 1982.
Department of Mathematics University College Dublin Belfield Dublin 4 Republic of Ireland
Rittnertstra3e 53 D 75oo Karlsruhe West Germany
(Eingegangen am 14. September 1983)