Symmetry properties of subdivision graphs

Abstract

The subdivision graph S() of a graph is obtained from by `adding a vertex' in the middle of every edge of . Various symmetry properties of () are studied. We prove that, for a connected graph , S() is locally s-arc transitive if and only if is s+12-arc transitive. The diameter of S() is 2d+δ, where has diameter d and 0≤slant δ≤slant 2, and local s-distance transitivity of () is defined for 1≤slant s≤slant 2d+δ. In the general case where s≤slant 2d-1 we prove that S() is locally s-distance transitive if and only if is s+12-arc transitive. For the remaining values of s, namely 2d≤slant s≤slant 2d+δ, we classify the graphs for which S() is locally s-distance transitive in the cases, s≤slant 5 and s≥slant 15+δ. The cases \2d, 6\≤slant s≤slant \2d+δ, 14+δ\ remain open.