On Rainbow-k-Connectivity of Random Graphs

Abstract

A path in an edge-colored graph is called a rainbow path if all edges on it have pairwise distinct colors. For k≥ 1, the rainbow-k-connectivity of a graph G, denoted rck(G), is the minimum number of colors required to color the edges of G in such a way that every two distinct vertices are connected by at least k internally disjoint rainbow paths. In this paper, we study rainbow-k-connectivity in the setting of random graphs. We show that for every fixed integer d≥ 2 and every k≤ O( n), p=( n)1/dn(d-1)/d is a sharp threshold function for the property rck(G(n,p))≤ d. This substantially generalizes a result due to Caro et al., stating that p= nn is a sharp threshold function for the property rc1(G(n,p))≤ 2. As a by-product, we obtain a polynomial-time algorithm that makes G(n,p) rainbow-k-connected using at most one more than the optimal number of colors with probability 1-o(1), for all k≤ O( n) and p=n-ε(1 o(1)) for some constant ε∈[0,1).