Stability of Cayley graphs on abelian groups of odd order
Abstract
Let X be a connected Cayley graph on an abelian group of odd order, such that no two distinct vertices of X have exactly the same neighbours. We show that the direct product X × K2 (also called the "canonical double cover" of X) has only the obvious automorphisms (namely, the ones that come from automorphisms of its factors X and K2). This means that X is "stable". The proof is short and elementary. The theory of direct products implies that K2 can be replaced with members of a much more general family of connected graphs.
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