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RADICAL RELATED TO SPECIAL ATOMS REVISITED

Published online by Cambridge University Press:  14 October 2014

HALINA FRANCE-JACKSON*
Affiliation:
Department of Mathematics and Applied Mathematics, Summerstrand Campus (South), PO Box 77000, Nelson Mandela Metropolitan University, Port Elizabeth 6031, South Africa email [email protected]
SRI WAHYUNI
Affiliation:
Jurusan Matematika, FMIPA UGM, Sekip Utara, Yogyakarta-Indonesia email [email protected]
INDAH EMILIA WIJAYANTI
Affiliation:
Jurusan Matematika, FMIPA UGM, Sekip Utara, Yogyakarta-Indonesia email [email protected]
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Abstract

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A semiprime ring $R$ is called a $\ast$-ring if the factor ring $R/I$ is in the prime radical for every nonzero ideal $I$ of $R$. A long-standing open question posed by Gardner asks whether the prime radical coincides with the upper radical $U(\ast _{k})$ generated by the essential cover of the class of all $\ast$-rings. This question is related to many other open questions in radical theory which makes studying properties of $U(\ast _{k})$ worthwhile. We show that $U(\ast _{k})$ is an N-radical and that it coincides with the prime radical if and only if it is complemented in the lattice $\mathbb{L}_{N}$ of all N-radicals. Along the way, we show how to establish left hereditariness and left strongness of important upper radicals and give a complete description of all the complemented elements in $\mathbb{L}_{N}$.

MSC classification

Type
Research Article
Copyright
Copyright © 2014 Australian Mathematical Publishing Association Inc. 

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