The Junta Method for Hypergraphs and the Erd\H{o}s-Chv\'{a}tal Simplex Conjecture
Abstract
Numerous problems in extremal hypergraph theory ask to determine the maximal size of a -uniform hypergraph on vertices that does not contain an `enlarged' copy of a fixed hypergraph . These include well-known problems such as the Erd\H{o}s-S\'{o}s `forbidding one intersection' problem and the Frankl-F\"{u}redi `special simplex' problem. We present a general approach to such problems, using a `junta approximation method' that originates from analysis of Boolean functions. We prove that any -free hypergraph is essentially contained in a `junta' -- a hypergraph determined by a small number of vertices -- that is also -free, which effectively reduces the extremal problem to an easier problem on juntas. Using this approach, we obtain, for all , a complete solution of the extremal problem for a large class of 's, which includes the aforementioned problems, and solves them for a large new set of parameters. We apply our method also to the 1974 Erd\H{o}s-Chv\'{a}tal simplex conjecture, which asserts that for any , the maximal size of a -uniform family that does not contain a -simplex (i.e., sets with empty intersection such that any of them intersect) is . We prove the conjecture for all and , provided .
Cite
@article{arxiv.1707.02643,
title = {The Junta Method for Hypergraphs and the Erd\H{o}s-Chv\'{a}tal Simplex Conjecture},
author = {Nathan Keller and Noam Lifshitz},
journal= {arXiv preprint arXiv:1707.02643},
year = {2021}
}
Comments
Revised version, to appear in Advances in Mathematics. Significant exposition changes. 81 pages, no figures