Ramsey size linear and generalization

Eng Keat Hng; Meng Ji; Ander Lamaison

arXiv:2603.25453·math.CO·March 31, 2026

Ramsey size linear and generalization

Eng Keat Hng, Meng Ji, Ander Lamaison

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Abstract

More than thirty years ago, Erd\H{o}s, Faudree, Rousseau, and Schelp posed a fundamental question in extremal graph theory: What is the optimal constant $c_{k}$ such that $r (C_{2 k + 1}, G) \leq c_{k} m$ for any graph $G$ with $m$ edges and no isolated vertices? In this paper, we make a significant step towards answering this question by proving that $r (C_{2 k + 1}, G) \leq (2 + o (1)) m + p,$ where $p$ denotes the number of vertices in $G$ . Additionally, we extend the work of Goddard and Kleitman and independently Sidorenko, who proved that $r (K_{3}, G) \leq 2 m + 1$ for any graph $G$ with $m$ edges and no isolated vertices. We generalize their findings to the clique version, establishing that $r (K_{r}, G) \leq c_{r} m^{(r - 1) /2}$ , and to the multicolor setting, showing that $r_{k + 1} (K_{3}; G) \leq c_{k} m^{(k + 1) /2} .$

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