Asymptotically sharp bounds for cancellative and union-free hypergraphs
Abstract
An -graph is called -cancellative if for arbitrary distinct edges , it holds that ; it is called -union-free if for arbitrary two distinct subsets , each consisting of at most edges, it holds that . Let and denote the maximum number of edges that can be contained in an -vertex -cancellative and -union-free -graph, respectively. The study of and has a long history, dating back to the classic works of Erd\H{o}s and Katona, and Erd\H{o}s and Moser in the 1970s. In 2020, Shangguan and Tamo showed that and for all and . In this paper, we determine the asymptotics of these two functions up to a lower order term, by showing that for all and , \begin{align*} \text{.} \end{align*} Previously, it was only known by a result of F\"uredi in 2012 that . To prove the lower bounds of the limits, we utilize a powerful framework developed recently by Delcourt and Postle, and independently by Glock, Joos, Kim, K\"uhn, and Lichev, which shows the existence of near-optimal hypergraph packings avoiding certain small configurations, and to prove the upper bounds, we apply a novel counting argument that connects to a classic result of Kleitman and Frankl on a special case of the famous Erd\H{o}s Matching Conjecture.
Keywords
Cite
@article{arxiv.2411.07908,
title = {Asymptotically sharp bounds for cancellative and union-free hypergraphs},
author = {Miao Liu and Chong Shangguan and Chenyang Zhang},
journal= {arXiv preprint arXiv:2411.07908},
year = {2024}
}
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21 pages