Set Systems and Families of Permutations with Small Traces

Abstract

We study the maximum size of a set system on n elements whose trace on any b elements has size at most k. We show that if for some b i 0 the shatter function fR of a set system ([n],R) satisfies fR(b) < 2i(b-i+1) then |R| = O(ni); this generalizes Sauer's Lemma on the size of set systems with bounded VC-dimension. We use this bound to delineate the main growth rates for the same problem on families of permutations, where the trace corresponds to the inclusion for permutations. This is related to a question of Raz on families of permutations with bounded VC-dimension that generalizes the Stanley-Wilf conjecture on permutations with excluded patterns.