A commutativity theorem

descriptionPublicationkeyboard_double_arrow_right Article 01 Dec 1980 English Publisher:Springer Science and Business Media LLCJournal:Algebra Universalis, volume 10, pages 260-263 (issn: 0002-5240, eissn: 1420-8911,

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Authors: Nicholson, W. K.; Yaqub, Adil;

doi: 10.1007/bf02482908

A commutativity theorem

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Abstract

LetR be an associative ring with identity which satisfies the identities(xy) k =(yx) k and(xy) l =(yx) l , wherek andl are relatively prime positive integers, depending onx andy. ThenR is commutative. Moreover, examples are given which show thatR need not be commutative if either of the above identities is dropped. This theorem is also true for groups.

Related Organizations

University of Calgary
Canada

Keywords

commutativity theorem, Center, normalizer (invariant elements) (associative rings and algebras)

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