Eccentricity function in distance-hereditary graphs

Abstract

A graph G=(V,E) is distance hereditary if every induced path of G is a shortest path. In this paper, we show that the eccentricity function e(v)=\d(v,u): u∈ V\ in any distance-hereditary graph G is almost unimodal, that is, every vertex v with e(v)> rad(G)+1 has a neighbor with smaller eccentricity. Here, rad(G)=\e(v): v∈ V\ is the radius of graph G. Moreover, we use this result to fully characterize the centers of distance-hereditary graphs. Several bounds on the eccentricity of a vertex with respect to its distance to the center of G or to the ends of a diametral path are established. Finally, we propose a new linear time algorithm to compute all eccentricities in a distance-hereditary graph.