A classification of graphs whose subdivision graphs are locally G-distance transitive

Abstract

The subdivision graph S() of a connected graph is constructed by adding a vertex in the middle of each edge. In a previous paper written with Cheryl E. Praeger, we characterised the graphs such that S() is locally (G,s)-distance transitive for s≤ 2\, diam()-1 and some G≤ Aut(). In this paper, we solve the remaining cases by classifying all the graphs such that the subdivision graphs is locally (G,s)-distance transitive for s≥ 2\, diam() and some G≤ Aut(). In particular, their subdivision graph are always locally G-distance transitive, except for the complete graphs.