Hardness result for the total rainbow k-connection of graphs

Abstract

A path in a total-colored graph is called total rainbow if its edges and internal vertices have distinct colors. For an -connected graph G and an integer k with 1≤ k ≤, the total rainbow k-connection number of G, denoted by trck(G), is the minimum number of colors used in a total coloring of G to make G total rainbow k-connected, that is, any two vertices of G are connected by k internally vertex-disjoint total rainbow paths. In this paper, we study the computational complexity of total rainbow k-connection number of graphs. We show that it is NP-complete to decide whether trck(G)=3.