Nonmedian Direct Products of Graphs with Loops

Abstract

A median graph is a connected graph in which, for every three vertices, there exists a unique vertex m lying on the geodesic between any two of the given vertices. We show that the only median graphs of the direct product G× H are formed when G=Pk, for any integer k≥ 3 and H=Pl, for any integer l≥ 2, with a loop at an end vertex, where the direct product is taken over all connected graphs G on at least three vertices or at least two vertices with at least one loop, and connected graphs H with at least one loop.