On the pronormality of subgroups of odd indices in finite simple symplectic groups

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 element g ∈ G. In [Sib. Math. J. 2015. Vol. 56, no. 6] we proved that subgroups of odd indeces are pronormal in many finite simple group. In [Proc. Steklov Inst. Math., to appear] we proved that a group PSp6n(q) with q 3 8 contains a nonpronormal subgroup of odd index. In this paper we prove that if n ∈ \2m, 2m(22k+1) m, k ∈ N \0\\ then a group PSp2n(q) with q 3 8 contains a nonpronormal subgroup of odd index; if n=2m then any subgroup of odd index is pronormal in a group PSp2n(q), where q 3 8.