English

Complete subgraphs in a multipartite graph

Combinatorics 2022-07-19 v1

Abstract

In 1975 Bollob\'as, Erd\H os, and Szemer\'edi asked the following question: given positive integers n,t,rn, t, r with 2tr12\le t\le r-1, what is the largest minimum degree δ(G)\delta(G) among all rr-partite graphs GG with parts of size nn and which do not contain a copy of Kt+1K_{t+1}? The r=t+1r=t+1 case has attracted a lot of attention and was fully resolved by Haxell and Szab\'{o}, and Szab\'{o} and Tardos in 2006. In this paper we investigate the r>t+1r>t+1 case of the problem, which has remained dormant for over forty years. We resolve the problem exactly in the case when r1(modt)r \equiv -1 \pmod{t}, and up to an additive constant for many other cases, including when r(3t1)(t1)r \geq (3t-1)(t-1). Our approach utilizes a connection to the related problem of determining the maximum of the minimum degrees among the family of balanced rr-partite rnrn-vertex graphs of chromatic number at most tt.

Keywords

Cite

@article{arxiv.2107.02370,
  title  = {Complete subgraphs in a multipartite graph},
  author = {Allan Lo and Andrew Treglown and Yi Zhao},
  journal= {arXiv preprint arXiv:2107.02370},
  year   = {2022}
}
R2 v1 2026-06-24T03:55:05.170Z