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Journal of the Indonesian Mathematical Society

Volume 21 Number 1 (April 2015)

Dian Ariesta Yuwaningsih (Universitas Gadjah Mada)
Indah Emilia Wijayanti (Universitas Gadjah Mada)

Publish Date
27 Apr 2015

Let $M$ be an $(R,S)$-module. In this paper a generalization of the m-system set of modules to $(R,S)$-modules is given. Then for an $(R,S)$-submodule $N$ of $M$, we define $\sqrt[(R,S)]{N}$ as the set of $a\in M$ such that every m-system containing $a$ meets $N$. It is shown that $\sqrt[(R,S)]{N}$ is the intersection of all jointly prime $(R,S)$-submodules of $M$ containing $N$. We define jointly prime radicals of an $(R,S)$-module $M$ as $rad_{(R,S)}(M)=\sqrt[(R,S)]{0}$. Then we present some properties of jointly prime radicals of an $(R,S)$-module.DOI : http://dx.doi.org/10.22342/jims.21.1.199.25-34

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Journal of the Indonesian Mathematical Society

Website

Abbrev

JIMS

Publisher

Indonesian Mathematical Society

Subject

Mathematics

Description

Journal of the Indonesian Mathematical Society disseminates new research results in all areas of mathematics and their applications. Besides research articles, the journal also receives survey papers that stimulate research in mathematics and their ...

Article Info

Abstract

ON JOINTLY PRIME RADICALS OF (R,S)-MODULES

Article Info

Abstract