A Commutattvity Theorem for Rings and Groups

W. K. Nicholson; Adil Yaqub

doi:10.4153/CMB-1979-055-9

Abstract

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The following theorem is proved: Suppose R is a ring with identity which satisfies the identities xkyk = ykxk and xlyl = ylxl, where k and l are positive relatively prime integers. Then R is commutative. This theorem also holds for a group G. Furthermore, examples are given which show that neither R nor G need be commutative if either of the above identities is dropped. The proof of the commutativity of R uses the fact that G is commutative, where G is taken to be the group R* of units in R.

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Article contents

A Commutattvity Theorem for Rings and Groups

Abstract

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References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

A Commutattvity Theorem for Rings and Groups

Abstract

Keywords

References

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