Maximal subgroups of small index of finite almost simple groups
Abstract
We prove in this paper that a finite almost simple group R with socle the non-abelian simple group S possesses a conjugacy class of core-free maximal subgroups whose index coincides with the smallest index l(S) of a maximal group of S or a conjugacy class of core-free maximal subgroups with a fixed index vS ≤ l(S)2, depending only on S. We show that the number of subgroups of the outer automorphism group of S is bounded by 3 l(S) and l(S)2 < |S|.
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