Note on minimally k-rainbow connected graphs

Abstract

An edge-colored graph G, where adjacent edges may have the same color, is rainbow connected if every two vertices of G are connected by a path whose edge has distinct colors. A graph G is k-rainbow connected if one can use k colors to make G rainbow connected. For integers n and d let t(n,d) denote the minimum size (number of edges) in k-rainbow connected graphs of order n. Schiermeyer got some exact values and upper bounds for t(n,d). However, he did not get a lower bound of t(n,d) for 3≤ d<n2 . In this paper, we improve his lower bound of t(n,2), and get a lower bound of t(n,d) for 3≤ d<n2.