Original Articles

STRONGLY PRIME GROUP RINGS

Published in: Quaestiones Mathematicae
Volume 3 , issue 4 , 1979 , pages: 241–247

DOI: 10.1080/16073606.1979.9631576

Author(s): N.J. Groenewald Department of Mathematics, South Africa

Keywords: 20C05

Abstract

A ring R is (right) strongly prime (SP) if every nonzero two sided ideal contains a finite set whose right annihilator is zero, SP rings have been studied by Handelman and Lawrence who raised the problem of characterizing SP group algebras. They showed that if R is SP and G is torsion free Abelian, then the group ring RG is SP. The aim of this note is to determine some more group rings which are SP.

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