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A new lower bound for the Ramsey numbers $R(3,k)$

Published 19 May 2025 in math.CO and math.PR | (2505.13371v1)

Abstract: We prove a new lower bound for the off-diagonal Ramsey numbers, [ R(3,k) \geq \bigg( \frac{1}{3}+ o(1) \bigg) \frac{k2}{\log k }\, , ] thereby narrowing the gap between the upper and lower bounds to a factor of $3+o(1)$. This improves the best known lower bound of $(1/4+o(1))k2/\log k$ due, independently, to Bohman and Keevash, and Fiz Pontiveros, Griffiths and Morris, resulting from their celebrated analysis of the triangle-free process. As a consequence, we disprove a conjecture of Fiz Pontiveros, Griffiths and Morris that the constant $1/4$ is sharp.

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