Traces of Hypergraphs

Abstract

Let Tr(n,m,k) denote the largest number of distinct projections onto k coordinates guaranteed in any family of m binary vectors of length n. The classical Sauer-Perles-Shelah Lemma implies that Tr(n, nr, k) = 2k for k r. While determining Tr(n,nr,k) precisely for general k seems hopeless even for constant r, estimating it, and more generally estimating the function Tr(n,m,k) for all range of the parameters, remains a widely open problem with connections to important questions in computer science and combinatorics. Here we essentially resolve this problem when k is linear and m=nr where r is constant, proving that, for any constant α>0, Tr(n,nr,α n) = (nC) with C=C(r,α)=r+1-(1+α)2-(1+α). For the proof we establish a "sparse" version of another classical result, the Kruskal-Katona Theorem, which gives a stronger guarantee when the hypergraph does not induce dense sub-hypergraphs. Furthermore, we prove that the parameters in our sparse Kruskal-Katona theorem are essentially best possible. Finally, we mention two simple applications which may be of independent interest.