Arc-transitive Cayley graphs on non-ableian simple groups with soluble vertex stabilizers and valency seven
Abstract
In this paper, we study arc-transitive Cayley graphs on non-abelian simple groups with soluble stabilizers and valency seven. Let be such a Cayley graph on a non-abelian simple group T. It is proved that either is a normal Cayley graph or is S-arc-transitive, with (S,T)=(n,n-1) and n=7,21,63 or 84; and, for each of these four values of n, there really exists arc-transitive 7-valent non-normal Cayley graphs on n-1 and specific examples are constructed.
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