Rainbow Connection for Complete Multipartite Graphs

Abstract

A path in an edge-colored graph is said to be rainbow if no color repeats on it. An edge-colored graph is said to be rainbow k-connected if every pair of vertices is connected by k internally disjoint rainbow paths. The rainbow k-connection number rck(G) is the minimum number of colors such that there exists a coloring with colors that makes G rainbow k-connected. Let f(k,t) be the minimum integer such that every t-partite graph with part sizes at least f(k,t) has rck(G) 4 if t=2 and rck(G) 3 if t 3. Answering a question of Fujita, Liu and Magnant, we show that \[ f(k,t) = 2kt-1 \] for all k≥ 2, t≥ 2. We also give some conditions for which rck(G) 3 if t=2 and rck(G) 2 if t 3.