On the automorphism groups of graphs with twice prime valency

Abstract

A graph is edge-transitive if its automorphism group acts transitively on the edge set. In this paper, we investigate the automorphism groups of edge-transitive graphs of odd order and twice prime valency. Let be a connected graph of odd order and twice prime valency, and let G be a subgroup of the automorphism group of . In the case where G acts transitively on the edges and quasiprimitively on the vertices of , we prove that either G is almost simple or G is a primitive group of affine type. If further G is an almost simple primitive group then, with two exceptions, the socle of G acts transitively on the edges of .