A linear upper bound on zero-sum Ramsey numbers of d-degenerate graphs in Zp

Abstract

Let p be a prime number and let G be a graph on n vertices and m edges. The zero-sum Ramsey number of G over Zp, denoted by R(G, Zp), is the minimum ∈ N such that for any edge-coloring c:E(K)p, there is a subgraph G'⊂ K isomorphic to G and satisfying Σe∈ E(G')c(e)=0. We prove that if G is a d-degenerate graph, then R(G, Zp)≤ n + (3+3d)p so long as m≥ 2pd(d+1)2, p divides m, and 2d<p. This generalizes a result by Colucci and D'Emidio on 1-degenerate graphs.