Finite simple exceptional groups of Lie type in which all the subgroups of odd index are pronormal
Abstract
A subgroup H of a group G is said to be pronormal in G if H and Hg are conjugate in H, Hg for every g ∈ G. In this paper we classify finite simple groups E6(q) and 2E6(q) in which all the subgroups of odd index are pronormal. Thus, we complete a classification of finite simple exceptional groups of Lie type in which all the subgroups of odd index are pronormal.
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