Symmetric Cayley graphs on non-abelian simple groups of valency 7

Abstract

Let be a connected 7-valent symmetric Cayley graph on a finite non-abelian simple group G. If is not normal, Li et al. [On 7-valent symmetric Cayley graphs of finite simple groups, J. Algebraic Combin. 56 (2022) 1097-1118] characterised the group pairs (soc(Aut()/K),GK/K), where K is a maximal intransitive normal subgroup of Aut(). In this paper, we improve this result by proving that if is not normal, then Aut() contains an arc-transitive non-abelian simple normal subgroup T such that G<T and (T,G)=(An,An-1) with n=7, 3· 7, 32· 7, 22· 3· 7, 23·3·7, 23·32·5·7, 24·32·5·7, 26·3·7, 27·3·7, 26·32·7, 26·34·52·7, 28·34·52·7, 27·34·52·7, 210·32·7, 224·32·7. Furthermore, soc(Aut()/R)=(T× R)/R, where R is the largest solvable normal subgroup of Aut().