A linear upper bound for zero-sum Ramsey numbers of bounded degree graphs
Abstract
Let G be a graph and a finite abelian group. The zero-sum Ramsey number of G over , denoted by R(G, ), is the smallest positive integer t (if it exists) such that any edge-colouring c:E(Kt) contains a copy of G with Σe∈ E(G)c(e)=0. We prove a linear upper bound R(G, )≤ Cn that holds for every n-vertex graph G with bounded maximum degree and every finite abelian group with || dividing e(G).
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