Upper bound for the rainbow connection number of bridgeless graphs with diameter 3

Abstract

A path in an edge-colored graph G, where adjacent edges may have the same color, is called rainbow if no two edges of the path are colored the same. The rainbow connection number rc(G) of G is the smallest integer k for which there exists a k-edge-coloring of G such that every pair of distinct vertices of G is connected by a rainbow path. It is known that for every integer k≥ 2 deciding if a graph G has rc(G)≤ k is NP-Hard, and a graph G with rc(G)≤ k has diameter diam(G)≤ k. In foregoing papers, we showed that a bridgeless graph with diameter 2 has rainbow connection number at most 5. In this paper, we prove that a bridgeless graph with diameter 3 has rainbow connection number at most 9. We also prove that for any bridgeless graph G with radius r, if every edge of G is contained in a triangle, then rc(G)≤ 3r. As an application, we get that for any graph G with minimum degree at least 3, rc(L(G))≤ 3 rad(L(G))≤ 3 (rad(G)+1).