Variants of theorems of Baer and Hall on finite-by-hypercentral groups
Abstract
We show that if a group G has a finite normal subgroup L such that G/L is hypercentral, then the index of the hypercenter of G is bounded by a function of the order of L. This completes recent results generalizing classical theorems by R. Baer and P. Hall. Then we apply our results to groups of automorphisms of a group G acting in a restricted way on an ascending normal series of G.
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