Stability of Cayley graphs and Schur rings

Abstract

A graph is said to be unstable if for the direct product × K2, Aut( × K2) is not isomorphic to Aut() × Z2. In this paper we show that a connected and non-bipartite Cayley graph Cay(H,S) is unstable if and only if the set S × \1\ belongs to a Schur ring over the group H × Z2 having certain properties. The Schur rings with these properties are characterized if H is an abelian group of odd order or a cyclic group of twice odd order. As an application, a short proof is given for the result of Witte Morris stating that every connected unstable Cayley graph on an abelian group of odd order has twins (Electron.~J.~Combin, 2021). As another application, sufficient and necessary conditions are given for a connected and non-bipartite circulant graph of order 2pe to be unstable, where p is an odd prime and e 1.