Existence of non-Cayley Haar graphs

Abstract

A Cayley graph of a group H is a finite simple graph such that its automorphism group Aut() contains a subgroup isomorphic to H acting regularly on V(), while a Haar graph of H is a finite simple bipartite graph such that Aut() contains a subgroup isomorphic to H acting semiregularly on V() and the H-orbits are equal to the partite sets of . It is well-known that every Haar graph of finite abelian groups is a Cayley graph. In this paper, we prove that every finite non-abelian group admits a non-Cayley Haar graph except the dihedral groups D6, D8, D10, the quaternion group Q8 and the group Q8×Z2. This answers an open problem proposed by Est\'elyi and Pisanski in 2016.