Bipartite bi-Cayley graphs over metacyclic groups of odd prime-power order

Abstract

A graph is a bi-Cayley graph over a group G if G is a semiregular group of automorphisms of having two orbits. Let G be a non-abelian metacyclic p-group for an odd prime p, and let be a connected bipartite bi-Cayley graph over the group G. In this paper, we prove that G is normal in the full automorphism group Aut() of when G is a Sylow p-subgroup of Aut(). As an application, we classify half-arc-transitive bipartite bi-Cayley graphs over the group G of valency less than 2p. Furthermore, it is shown that there are no semisymmetric and no arc-transitive bipartite bi-Cayley graphs over the group G of valency less than p.