Minimal Ramsey graphs with many vertices of small degree

TL;DR

This paper investigates the structure of minimal q-Ramsey graphs for a given graph H, focusing on the number of vertices with minimum degree and introducing new gadget constructions to analyze their properties.

Contribution

It introduces the concept of s_q-abundant graphs, proves that all cycles are s_q-abundant, and develops new pattern gadgets for constructing minimal Ramsey graphs.

Findings

Every cycle is s_q-abundant for any q ≥ 2.

Extended results for cliques and pendant edges.

New gadget graphs generalizing previous constructions.

Abstract

Given any graph $H$, a graph $G$ is said to be $q$-Ramsey for $H$ if every coloring of the edges of $G$ with $q$ colors yields a monochromatic subgraph isomorphic to $H$. Further, such a graph $G$ is said to be minimal $q$-Ramsey for $H$ if additionally no proper subgraph $G'$ of $G$ is $q$-Ramsey for $H$. In 1976, Burr, Erd\H{o}s, and Lov\'asz initiated the study of the parameter $s_q(H)$, defined as the smallest minimum degree among all minimal $q$-Ramsey graphs for $H$. In this paper, we consider the problem of determining how many vertices of degree $s_q(H)$ a minimal $q$-Ramsey graph for $H$ can contain. Specifically, we seek to identify graphs for which a minimal $q$-Ramsey graph can contain arbitrarily many such vertices. We call a graph satisfying this property $s_q$-abundant. Among other results, we prove that every cycle is $s_q$-abundant for any integer $q\geq 2$. We also discuss the cases when $H$ is a clique or a clique with a pendant edge, extending previous results of Burr et al. and Fox et al. To prove our results and construct suitable minimal Ramsey graphs, we develop certain new gadget graphs, called pattern gadgets, which generalize and extend earlier constructions that have proven useful in the study of minimal Ramsey graphs. These new gadgets might be of independent interest.