Uniform Set Systems with Uniform Witnesses

TL;DR

This paper investigates bounds on uniform set families with fixed-size witnesses, proving the conjecture for certain parameters and constructing counterexamples for others, highlighting complex behaviors in combinatorial set systems.

Contribution

The paper proves the conjecture for cases where the witness size s is at most half of d and constructs non-star counterexamples for larger s, expanding understanding of set family structures.

Findings

Conjecture holds for s ≤ d/2 with maximal families being stars.

Constructs non-star families of size inom{n-1}{d} for s > d/2.

Shows the problem's complexity varies significantly with s.

Abstract

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