A sharp upper bound for the rainbow 2-connection number of 2-connected graphs

Abstract

A path in an edge-colored graph is called rainbow if no two edges of it are colored the same. For an -connected graph G and an integer k with 1≤ k≤ , the rainbow k-connection number rck(G) of G is defined to be the minimum number of colors required to color the edges of G such that every two distinct vertices of G are connected by at least k internally disjoint rainbow paths. Fujita et. al. proposed a problem that what is the minimum constant α>0 such that for all 2-connected graphs G on n vertices, we have rc2(G)≤ α n. In this paper, we prove that α=1 and rc2(G)=n if and only if G is a cycle of order n, settling down this problem.