Nordhaus-Gaddum-type theorem for total proper connection number of graphs

Abstract

A graph is said to be total-colored if all the edges and the vertices of the graph are colored. A path P in a total-colored graph G is called a total-proper path if (i) any two adjacent edges of P are assigned distinct colors; (ii) any two adjacent internal vertices of P are assigned distinct colors; (iii) any internal vertex of P is assigned a distinct color from its incident edges of P. The total-colored graph G is total-proper connected if any two distinct vertices of G are connected by a total-proper path. The total-proper connection number of a connected graph G, denoted by tpc(G), is the minimum number of colors that are required to make G total-proper connected. In this paper, we first characterize the graphs G on n vertices with tpc(G)=n-1. Based on this, we obtain a Nordhaus-Gaddum-type result for total-proper connection number. We prove that if G and G are connected complementary graphs on n vertices, then 6≤ tpc(G)+tpc(G)≤ n+2. Examples are given to show that the lower bound is sharp for n≥ 4. The upper bound is reached for n≥ 5 if and only if G or G is the tree with maximum degree n-2.