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paper

A New Upper Bound for Diagonal Ramsey Numbers

arXiv:math/0607788

Abstract

We prove a new upper bound for diagonal two-colour Ramsey numbers, showing that there exists a constant $C$ such that \[r(k+1, k+1) \leq k^{- C \frac{\log k}{\log \log k}} \binom{2k}{k}.\]

22 pages