Rainbow connection number, bridges and radius

Abstract

Let G be a connected graph. The notion the rainbow connection number rc(G) of a graph G was introduced recently by Chartrand et al. Basavaraju et al. showed that for every bridgeless graph G with radius r, rc(G)≤ r(r+2), and the bound is tight. In this paper, we prove that if G is a connected graph, and Dk is a connected k-step dominating set of G, then G has a connected (k-1)-step dominating set Dk-1⊃ Dk such that rc(G[Dk-1])≤ rc(G[Dk])+\2k+1,bk\, where bk is the number of bridges in E(Dk, N(Dk)). Furthermore, for a connected graph G with radius r, let u be the center of G, and Dr=\u\. Then G has r-1 connected dominating sets Dr-1, Dr-2,..., D1 satisfying Dr⊂ Dr-1⊂ Dr-2 ...⊂ D1⊂ D0=V(G), and rc(G)≤ Σi=1r\2i+1,bi\, where bi is the number of bridges in E(Di, N(Di)), 1≤ i ≤ r. From the result, we can get that if for all 1≤ i≤ r, bi≤ 2i+1, then rc(G)≤ Σi=1r(2i+1)= r(r+2); if for all 1≤ i≤ r, bi> 2i+1, then rc(G)= Σi=1rbi, the number of bridges of G. This generalizes the result of Basavaraju et al.