A framework for the generalised Erdos-Rothschild problem and a resolution of the dichromatic triangle case

Abstract

The Erdos-Rothschild problem from 1974 asks for the maximum number of s-edge colourings in an n-vertex graph which avoid a monochromatic copy of Kk, given positive integers n,s,k. In this paper, we systematically study the generalisation of this problem to a given forbidden family of colourings of Kk. This problem typically exhibits a dichotomy whereby for some values of s, the extremal graph is the `trivial' one, namely the Tur\'an graph on k-1 parts, with no copies of Kk; while for others, this graph is no longer extremal and determining the extremal graph becomes much harder. We generalise a framework developed for the monochromatic Erdos-Rothschild problem to the general setting and work in this framework to obtain our main results, which concern two specific forbidden families: triangles with exactly two colours, and improperly coloured cliques. We essentially solve these problems fully for all integers s ≥ 2 and large n. In both cases we obtain an infinite family of structures which are extremal for some s, which are the first results of this kind. A consequence of our results is that for every non-monochromatic colour pattern, every extremal graph is complete partite. Our work extends work of Hoppen, Lefmann and Schmidt and of Benevides, Hoppen and Sampaio.

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