Stability of circulant graphs
arXiv:1802.04921
Abstract
The canonical double cover $\mathrm{D}(Î)$ of a graph $Î$ is the direct product of $Î$ and $K_2$. If $\mathrm{Aut}(\mathrm{D}(Î))=\mathrm{Aut}(Î)\times\mathbb{Z}_2$ then $Î$ is called stable; otherwise $Î$ is called unstable. An unstable graph is nontrivially unstable if it is connected, non-bipartite and distinct vertices have different neighborhoods. In this paper we prove that every circulant graph of odd prime order is stable and there is no arc-transitive nontrivially unstable circulant graph. The latter answers a question of Wilson in 2008. We also give infinitely many counterexamples to a conjecture of MaruÅ¡iÄ, Scapellato and Zagaglia Salvi in 1989 by constructing a family of stable circulant graphs with compatible adjacency matrices.