Products of subgroups, subnormality, and relative orders of elements
Abstract
Let G be a group. We give an explicit description of the set of elements x ∈ G such that x|G:H| ∈ H for every subgroup of finite index H ≤slant G. This is related to the following problem: given two subgroups H and K, with H of finite index, when does |HK:H| divide |G:H|?
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