
doi: 10.1007/bf02686249
A Chernikov group is a finite extension of a direct product of finitely many quasicyclic groups. A generalized Chernikov group \(G\) is an extension of a direct product \(A\) of quasicyclic \(p\)-groups with finitely many factors for each prime \(p\) by a locally normal group \(B\), where each element of \(G\) is element-wise permutable with all but a finite number of primary Sylow subgroups of \(A\). The author considers groups in which the elements with finite order form a generalized Chernikov group. Using earlier results of his he characterizes these groups in particular under the condition that there are no elements of order \(2\).
elements of finite order, Generalizations of solvable and nilpotent groups, Chains and lattices of subgroups, subnormal subgroups, minimality conditions, primary minimality, Periodic groups; locally finite groups, biprimitively conjugately finite groups, Subgroup theorems; subgroup growth, infinite groups, Chernikov groups
elements of finite order, Generalizations of solvable and nilpotent groups, Chains and lattices of subgroups, subnormal subgroups, minimality conditions, primary minimality, Periodic groups; locally finite groups, biprimitively conjugately finite groups, Subgroup theorems; subgroup growth, infinite groups, Chernikov groups
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