A very robust Ramsey theorem for matchings

Abstract

Our main result is a robust generalisation of the Cockayne-Lorimer theorem on the multicolour Ramsey number of matchings. It is moreover a generalisation of the transference generalisation of Cockayne-Lorimer, which (informally) says that the random graph G G(n,p) with np ∞ has, with high probability, essentially the same Ramsey matching properties as the complete graph Kn. We show, somewhat surprisingly, that the same is true under the rather weak robustness assumption that G is an s-connector (i.e. G is Ks,s-free) with s=o(n). Moreover, we show that such G has only an additive O(s) loss with respect to Kn for monochromatic matchings, which is essentially sharp. Our proof adapts a compression algorithm based on Gallai-Edmonds decompositions that we developed previously for generalised Ramsey-Tur\'an problems.

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