The maximum average connectivity among all orientations of a graph

Abstract

For distinct vertices u and v in a graph G, the connectivity between u and v, denoted G(u,v), is the maximum number of internally disjoint u--v paths in G. The average connectivity of G, denoted (G), is the average of G(u,v) taken over all unordered pairs of distinct vertices u,v of G. Analogously, for a directed graph D, the connectivity from u to v, denoted D(u,v), is the maximum number of internally disjoint directed u--v paths in D. The average connectivity of D, denoted (D), is the average of D(u,v) taken over all ordered pairs of distinct vertices u,v of D. An orientation of a graph G is a directed graph obtained by assigning a direction to every edge of G. For a graph G, let (G) denote the maximum average connectivity among all orientations of G. In this paper we obtain bounds for (G) and for the ratio (G)/(G) for all graphs G of a given order and in a given class of graphs. Whenever possible, we demonstrate sharpness of these bounds. This problem had previously been studied for trees. We focus on the classes of cubic 3-connected graphs, minimally 2-connected graphs, 2-trees, and maximal outerplanar graphs.