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image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao
Mathematical Notes
Article . 1995 . Peer-reviewed
License: Springer Nature TDM
Data sources: Crossref
image/svg+xml Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao Closed Access logo, derived from PLoS Open Access logo. This version with transparent background. http://commons.wikimedia.org/wiki/File:Closed_Access_logo_transparent.svg Jakob Voss, based on art designer at PLoS, modified by Wikipedia users Nina and Beao
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Left and right distributive rings

Authors: Tuganbaev, A. A.;

Left and right distributive rings

Abstract

Distributive rings and modules are studied and the relations between distributivity and diverse properties of rings (such as the properties to be invariant, localizable, reduced etc.) are exposed. We list short summaries of the main results. The right distributive right antisingular rings are described in different ways, in particular as rings \(A\) such that for each maximal right ideal \(M\) the right ring of quotients \(A_M\) exists and is a right chain domain. The right distributivity of a reduced ring \(A\) with the condition: (*) for every \(a\in A\) there is a positive integer \(n\) such that \(a^n A=Aa^n\), implies the left distributivity of \(A\). If \(A\) is a right distributive ring algebraic over its center, then the quotient ring \(R=A/N\) is a left distributive ring with condition (*) and the prime radical \(N\) of \(R\) coincides with the set of all nilpotent elements of \(A\). Each right Bezout module over a right quasiinvariant ring is distributive. If \(A\) is a right Bezout ring in which all maximal right ideals are ideals, then \(A\) is right distributive and in this case each of the following conditions implies the left distributivity of \(A\): (1) \(A\) is algebraic over its center and semiprime; (2) \(A\) is a left Bezout ring.

Related Organizations
Keywords

Prime and semiprime associative rings, nilpotent elements, right rings of quotients, right chain domains, Structure and representation theory of distributive lattices, right quasiinvariant rings, distributive rings, Other classes of modules and ideals in associative algebras, Ore rings, multiplicative sets, Ore localization, right distributivity, right distributive right antisingular rings, prime radical, right Bezout modules, left distributivity, maximal right ideals, Chain conditions on other classes of submodules, ideals, subrings, etc.; coherence (associative rings and algebras), reduced rings, Ideals in associative algebras

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selected citations
These citations are derived from selected sources.
This is an alternative to the "Influence" indicator, which also reflects the overall/total impact of an article in the research community at large, based on the underlying citation network (diachronically).
BIP!Citations provided by BIP!
popularity
This indicator reflects the "current" impact/attention (the "hype") of an article in the research community at large, based on the underlying citation network.
BIP!Popularity provided by BIP!
influence
This indicator reflects the overall/total impact of an article in the research community at large, based on the underlying citation network (diachronically).
BIP!Influence provided by BIP!
impulse
This indicator reflects the initial momentum of an article directly after its publication, based on the underlying citation network.
BIP!Impulse provided by BIP!
1
Average
Average
Average
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