Rainbow Connectivity of Sparse Random Graphs

Abstract

An edge colored graph G is rainbow edge connected if any two vertices are connected by a path whose edges have distinct colors. The rainbow connectivity of a connected graph G, denoted by rc(G), is the smallest number of colors that are needed in order to make G rainbow connected. In this work we study the rainbow connectivity of binomial random graphs at the connectivity threshold p= n+n where =(n)∞ and =o(n) and of random r-regular graphs where r ≥ 3 is a fixed integer. Specifically, we prove that the rainbow connectivity rc(G) of G=G(n,p) satisfies rc(G) Z1,diameter(G) with high probability (). Here Z1 is the number of vertices in G whose degree equals 1 and the diameter of G is asymptotically equal to . Finally, we prove that the rainbow connectivity rc(G) of the random r-regular graph G=G(n,r) satisfies rc(G) =O(2n) .