Upper bounds for multicolour Ramsey numbers

Abstract

The r-colour Ramsey number Rr(k) is the minimum n ∈ N such that every r-colouring of the edges of the complete graph Kn on n vertices contains a monochromatic copy of Kk. We prove, for each fixed r ≥slant 2, that Rr(k) ≤slant e-δ k rrk for some constant δ = δ(r) > 0 and all sufficiently large k ∈ N. For each r ≥slant 3, this is the first exponential improvement over the upper bound of Erdos and Szekeres from 1935. In the case r = 2, it gives a different (and significantly shorter) proof of a recent result of Campos, Griffiths, Morris and Sahasrabudhe.

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