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Main Authors: Kupavskii, Andrey, Zakharov, Dmitriy
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2203.13379
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author Kupavskii, Andrey
Zakharov, Dmitriy
author_facet Kupavskii, Andrey
Zakharov, Dmitriy
contents We develop a new approach to approximate families of sets, complementing the existing `$Δ$-system method' and `junta approximations method'. The approach, which we refer to as `spread approximations method', is based on the notion of $r$-spread families and builds on the recent breakthrough result of Alweiss, Lovett, Wu and Zhang for the Erd\H os--Rado `Sunflower Conjecture'. Our approach can work in a variety of sparse settings. To demonstrate the versatility and strength of the approach, we present several of its applications to forbidden intersection problems, including bounds on the size of regular intersecting families, the resolution of the Erd\H os--Sós problem for sets in a new range and, most notably, the resolution of the $t$-intersection and Erd\H os--Sós problems for permutations in a new range. Specifically, we show that any collection of permutations of an $n$-element set with no two permutations intersecting in at most (exactly) $t-1$ elements has size at most $(n-t)!$, provided $t\le n^{1-ε}$ ($t \le n^{\frac{1}{3}-ε}$) for an arbitrary $ε>0$ and $n>n_0(ε)$. Previous results for these problems only dealt with the case of fixed $t$. The proof follows the structure vs. randomness philosophy, which proved to be very efficient in proving results throughout mathematics and computer science.
format Preprint
id arxiv_https___arxiv_org_abs_2203_13379
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Spread approximations for forbidden intersections problems
Kupavskii, Andrey
Zakharov, Dmitriy
Combinatorics
We develop a new approach to approximate families of sets, complementing the existing `$Δ$-system method' and `junta approximations method'. The approach, which we refer to as `spread approximations method', is based on the notion of $r$-spread families and builds on the recent breakthrough result of Alweiss, Lovett, Wu and Zhang for the Erd\H os--Rado `Sunflower Conjecture'. Our approach can work in a variety of sparse settings. To demonstrate the versatility and strength of the approach, we present several of its applications to forbidden intersection problems, including bounds on the size of regular intersecting families, the resolution of the Erd\H os--Sós problem for sets in a new range and, most notably, the resolution of the $t$-intersection and Erd\H os--Sós problems for permutations in a new range. Specifically, we show that any collection of permutations of an $n$-element set with no two permutations intersecting in at most (exactly) $t-1$ elements has size at most $(n-t)!$, provided $t\le n^{1-ε}$ ($t \le n^{\frac{1}{3}-ε}$) for an arbitrary $ε>0$ and $n>n_0(ε)$. Previous results for these problems only dealt with the case of fixed $t$. The proof follows the structure vs. randomness philosophy, which proved to be very efficient in proving results throughout mathematics and computer science.
title Spread approximations for forbidden intersections problems
topic Combinatorics
url https://arxiv.org/abs/2203.13379