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A Density Turán Theorem

arXiv:1503.03441 · doi:10.1002/jgt.22075

Abstract

Let $F$ be a graph which contains an edge whose deletion reduces its chromatic number. For such a graph $F,$ a classical result of Simonovits from 1966 shows that every graph on $n\ge n_0(F)$ vertices with more than $\frac{χ(F)-2}{χ(F)-1}\cdot \frac{n^2}{2}$ edges contains a copy of $F$. In this paper we derive a similar theorem for multipartite graphs. For a graph $H$ and an integer $\ell \geq v(H)$, let $d_{\ell}(H)$ be the minimum real number such that every $\ell$-partite graph whose edge density between any two parts is greater than $d_{\ell}(H)$ contains a copy of $H$. Our main contribution is to show that $d_{\ell}(H)=\frac{χ(H)-2}{χ(H)-1}$ for $\ell \ge \ell_0(H)$ sufficiently large if and only if $H$ admits a vertex-colouring with $χ(H)-1$ colours such that all colour classes but one are independent sets, and the exceptional class induces just a matching. When $H$ is a clique, this recovers a result of Pfender [Complete subgraphs in multipartite graphs, Combinatorica 32 (2012), 483--495]. We also consider several extensions of Pfender's result.

28 pages, 2 figures