On the multicolor Tur\'an conjecture for color-critical graphs

Abstract

A simple k-coloring of a multigraph G is a decomposition of the edge multiset as a disjoint sum of k simple graphs which are referred as colors. A subgraph H of a multigraph G is called multicolored if its edges receive distinct colors in a given simple k-coloring of G. In 2004, Keevash-Saks-Sudakov-Verstra\"ete introduced the k-color Tur\'an number exk(n,H), which denotes the maximum number of edges in an n-vertex multigraph that has a simple k-coloring containing no multicolored copies of H. They made a conjecture for any r≥ 3 and r-color-critical graph H that in the range of k≥ r-1r-2(e(H)-1), if n is sufficiently large, then exk(n, H) is achieved by the multigraph consisting of k colors all of which are identical copies of the Tur\'an graph Tr-1(n). In this paper, we show that this holds in the range of k≥ 2r-1r(e(H)-1), significantly improving earlier results. Our proof combines the stability argument of Chakraborti-Kim-Lee-Liu-Seo with a novel graph packing technique for embedding multigraphs.

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