On basic graphs of symmetric graphs of valency five

Abstract

A graph is symmetric or arc-transitive if its automorphism group () is transitive on the arc set of the graph, and is basic if () has no non-trivial normal subgroup N such that the quotient graph N has the same valency with . In this paper, we classify symmetric basic graphs of order 2qpn and valency 5, where q<p are two primes and n is a positive integer. It is shown that such a graph is isomorphic to a family of Cayley graphs on dihedral groups of order 2q with 5 (q-1), the complete graph K6 of order 6, the complete bipartite graph K5,5 of order 10, or one of the nine sporadic coset graphs associated with non-abelian simple groups. As an application, connected pentavalent symmetric graphs of order kpn for some small integers k and n are classified.