On the Wiener Index of Orientations of Graphs

Abstract

The Wiener index of a strong digraph D is defined as the sum of the distances between all ordered pairs of vertices. This definition has been extended to digraphs that are not necessarily strong by defining the distance from a vertex a to a vertex b as 0 if there is no path from a to b in D. Knor, Skrekovski and Tepeh [Some remarks on Wiener index of oriented graphs. Appl.\ Math.\ Comput.\ 273] considered orientations of graphs with maximum Wiener index. The authors conjectured that for a given tree T, an orientation D of T of maximum Wiener index always contains a vertex v such that for every vertex u, there is either a (u,v)-path or a (v,u)-path in D. In this paper we disprove the conjecture. We also show that the problem of finding an orientation of maximum Wiener index of a given graph is NP-complete, thus answering a question by Knor, Skrekovski and Tepeh [Orientations of graphs with maximum Wiener index. Discrete Appl.\ Math.\ 211]. We briefly discuss the corresponding problem of finding an orientation of minimum Wiener index of a given graph, and show that the special case of deciding if a given graph on m edges has an orientation of Wiener index m can be solved in time quadratic in n.