On groups in which every element has a prime power order and which satisfy some boundedness condition

Abstract

In this paper we shall deal with periodic groups, in which each element has a prime power order. A group G will be called a BCP-group if each element of G has a prime power order and for each p∈ π(G) there exists a positive integer up such that each p-element of G is of order pi≤ pup. A group G will be called a BSP-group if each element of G has a prime power order and for each p∈ π(G) there exists a positive integer vp such that each finite p-subgroup of G is of order pj≤ pvp. Here π(G) denotes the set of all primes dividing the order of some element of G. Our main results are the following four theorems. Theorem 1: Let G be a finitely generated BCP-group. Then G has only a finite number of normal subgroups of finite index. Theorem 4: Let G be a locally graded BCP-group. Then G is a locally finite group. Theorem 7: Let G be a locally graded BSP-group. Then G is a finite group. Theorem 9: Let G be a BSP-group satisfying 2∈ π(G). Then G is a locally finite group.

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