Anti-van der Waerden Numbers of Graph Products of Cycles

Abstract

A k-term arithmetic progression (k-AP) in a graph G is a list of vertices such that each consecutive pair of vertices is the same distance apart. If c is a coloring function of the vertices of G and a k-AP in G has each vertex colored distinctly, then that k-AP is a rainbow k-AP. The anti-van der Waerden number of a graph G with respect to k is the least positive integer r such that every surjective coloring with domain V(G) and codomain \1,2,…,r\ = [r] is guaranteed to have a rainbow k-AP. This paper focuses on 3-APs and graph products with cycles. Specifically, the anti-van der Waerden number with respect to 3 is determined precisely for Pm Cn, Cm Cn and G C2n+1.

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