On a bottom layer in a group
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KU Publ.
Abstract
We consider the problem of recognizing a group by its bottom layer. This problem is solved in the class
of layer-finite groups. A group is layer-finite if it has a finite number of elements of every order. This
concept was first introduced by S. N. Chernikov. It appeared in connection with the study of infinite locally
finite p-groups in the case when the center of the group has a finite index. S. N. Chernikov described the
structure of an arbitrary group in which there are only finite elements of each order and introduced the
concept of layer-finite groups in 1948. Bottom layer of the group G is a set of its elements of prime order.
If have information about the bottom layer of a group we can receive results about its recognizability by
bottom layer. The paper presents the examples of groups that are recognizable, almost recognizable and
unrecognizable by its bottom layer under additional conditions.
Keywords: group, layer-finiteness, bottom layer, thin layer-finite group
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Senashov V.I. On a bottom layer in a group/V.I. Senashov, I.A. Paraschuk//Қарағанды университетінің хабаршысы. Математика сериясы = Вестник Карагандинского университета. Серия Математика.= Bulletin of the Karaganda university. Mathematics Series. -2020. №4. Р.136-142.