On zero-sum Ramsey numbers modulo 3

Abstract

We start with a systematic study of the zero-sum Ramsey numbers. For a graph G with 0 \ (\!\!\!\! 3) edges, the zero-sum Ramsey number is defined as the smallest positive integer R(G, Z3) such that for every n ≥ R(G, Z3) and every edge-colouring f of Kn using Z3, there is a zero-sum copy of G in Kn coloured by f, that is: Σe ∈ E(G) f(e) 0 \ (\!\!\!\! 3). Only sporadic results are known for these Ramsey numbers, and we discover many new ones. In particular we prove that for every forest F on n vertices and with 0 \ (\!\!\!\! 3) edges, R(F, Z3) ≤ n+2, and this bound is tight if all the vertices of F have degrees 1 \ (\!\!\!\! 3). We also determine exact values of R(T, Z3) for infinite families of trees.