Difference between revisions of "Kruskal-Katona theorem"
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Revision as of 18:53, 24 March 2012
Let and
,
(cf. also Sperner property; Sperner theorem). The elements of
can be linearly ordered in the following way:
if the largest element in which
and
differ is in
(cf. also Totally ordered set). If
,
, is the
th element in this order, then
![]() | (a1) |
since
-element subsets of
have maximal element smaller than
,
have maximal element
but the second largest element smaller than
, etc.. Equation (a1) is called the
-representation of
,
(for
, one takes
,
,
). This (unique) representation can be found directly by choosing
maximal such that
,
maximal such that
, etc..
For a family , the lower shadow of
is defined by
![]() |
If is given as above, then the lower shadow of the family of the first
elements in
is the family of all
-element subsets of
having maximal element smaller than
, of all
-element subsets of
having maximal element
, but the second largest element smaller than
, etc., i.e. the family of the first
elements of
where
![]() |
The Kruskal–Katona theorem states that in this way one obtains a lower shadow of minimum size, i.e., if is any
-element family in
and
is given by (a1), then
![]() |
There exist generalizations to similar results for other partially ordered sets, like products of chains, products of stars, the partially ordered set of subwords of -
-words, and the partially ordered set of submatrices of a matrix.
The following result of L. Lovász is weaker but numerically easier to handle: If and
with some real
, where
, then
![]() |
The original papers by J.B. Kruskal and G.O.H. Katona are [a3], [a4].
According to [a2], p. 1296, the Kruskal–Katona theorem is probably the most important one in finite extremal set theory.
References
[a1] | K. Engel, "Sperner theory" , Cambridge Univ. Press (1997) |
[a2] | P. Frankl, "Extremal set systems" R.L. Graham (ed.) M. Grötschel (ed.) L. Lovász (ed.) , Handbook of Combinatorics , 2 , Elsevier (1995) pp. 1293–1329 |
[a3] | J.B. Kruskal, "The number of simplices in a complex" , Mathematical Optimization Techniques , Univ. California Press (1963) pp. 251–278 |
[a4] | G.O.H. Katona, "A theorem of finite sets" , Theory of Graphs. Proc. Colloq. Tihany , Akad. Kiadó (1966) pp. 187–207 |
Kruskal-Katona theorem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Kruskal-Katona_theorem&oldid=15000