Uniform Set Systems with Uniform Witnesses

Abstract

Frankl--Pach and Erdos conjectured that any (d+1)-uniform set family F⊂eq [n]d+1 with VC-dimension at most d has size at most n-1d when n is sufficiently large. Ahlswede and Khachatrian showed that the conjecture is false by giving a counterexample of size n-1d+n-4d-2. For a set family F⊂eq [n]d+1, the condition that its VC-dimension is at most d can be reformulated as follows: for any F∈F, there exists a set BF⊂eq F such that F F'≠ BF for all F'∈F. In this direction, the first author, Xu, Yip, and Zhang conjectured that the bound n-1d holds if we further assume that |BF|=s for every F∈ F and for some fixed 0≤ s≤ d. The case s=0 is exactly the Erdos--Ko--Rado theorem, and the cases s∈ \1,d\ were proved in the paper by the first author, Xu, Yip, and Zhang. In this short note, we show that the conjecture holds when s≤ d/2, and the maximal constructions are stars. Moreover, we construct non-star set families of size n-1d satisfying the condition for d/2<s≤ d-1, which suggests that the problem is substantially different in these cases.