New bounds for Ramsey numbers involving graphs with a center

Yanbo Zhang; Yaojun Chen

arXiv:2604.13850·math.CO·April 16, 2026

New bounds for Ramsey numbers involving graphs with a center

Yanbo Zhang, Yaojun Chen

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TL;DR

This paper improves bounds for certain Ramsey numbers involving graphs with a central vertex and introduces a blow-up technique for new lower bounds.

Contribution

It provides improved bounds for specific Ramsey numbers and introduces a novel blow-up technique for wheels versus cliques.

Findings

01

Enhanced bounds for R(F_n,F_m) and R(W_n,W_n)

02

New lower bounds for R(ĤK_n, ĤK_n)

03

A blow-up technique for wheels versus cliques

Abstract

Let $F_{n}$ , $W_{n}$ , and $K_{n}$ be the graphs obtained by joining a vertex to $n$ independent edges, a cycle and a path of order $n - 1$ , respectively. In this paper, we give new bounds for the Ramsey numbers $R (F_{n}, F_{m})$ and $R (W_{n}, W_{n})$ , which improve those due to Chen, Yu, and Zhao [EJC, 2021] and Mao, Wang, Magnant, and Schiermeyer [G&C, 2022], respectively, and establish lower and upper bounds for $R (K_{n}, K_{n})$ . Moreover, we present a blow-up technique to establish some new lower bounds for the Ramsey numbers of wheels versus cliques.

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