Rainbow monochromatic k-edge-connection colorings of graphs

Abstract

A path in an edge-colored graph is called a monochromatic path if all edges of the path have a same color. We call k paths P1,·s,Pk rainbow monochromatic paths if every Pi is monochromatic and for any two i≠ j, Pi and Pj have different colors. An edge-coloring of a graph G is said to be a rainbow monochromatic k-edge-connection coloring (or RMCk-coloring for short) if every two distinct vertices of G are connected by at least k rainbow monochromatic paths. We use rmck(G) to denote the maximum number of colors that ensures G has an RMCk-coloring, and this number is called the rainbow monochromatic k-edge-connection number. We prove the existence of RMCk-colorings of graphs, and then give some bounds of rmck(G) and present some graphs whose rmck(G) reaches the lower bound. We also obtain the threshold function for rmck(G(n,p))≥ f(n), where n2> k≥ 1.