A CLASS OF EXCHANGE RINGS
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Publication:3529465
DOI10.1017/S0017089508004370zbMath1159.16006WikidataQ57788018 ScholiaQ57788018MaRDI QIDQ3529465
Publication date: 13 October 2008
Published in: Glasgow Mathematical Journal (Search for Journal in Brave)
Structure and classification for modules, bimodules and ideals (except as in 16Gxx), direct sum decomposition and cancellation in associative algebras) (16D70) Conditions on elements (16U99) Ideals in associative algebras (16D25) Center, normalizer (invariant elements) (associative rings and algebras) (16U70) von Neumann regular rings and generalizations (associative algebraic aspects) (16E50)
Related Items
Generalizations of UU-rings, UJ-rings and UNJ-rings ⋮ J-Boolean group rings and skew group rings ⋮ A Class of Quasipolar Rings ⋮ On Uniquely Clean Rings ⋮ Exchange elements in rings, and the equation $XA-BX=I$ ⋮ Rings whose Elements are the Sum of a Tripotent and an Element from the Jacobson Radical ⋮ Exchange Ideals with All Idempotents Central ⋮ On a Quotient of Skew Polynomial Rings
Cites Work
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- Extensions of exchange rings
- Strong lifting.
- Refinements for infinite direct decompositions of algebraic systems
- Exchange rings and decompositions of modules
- Clean general rings.
- COMMUTATIVE RINGS WHOSE ELEMENTS ARE A SUM OF A UNIT AND IDEMPOTENT
- Lifting Idempotents and Exchange Rings
- Strongly clean rings and fitting's lemma
- Exchange rings, units and idempotents
- On exchange rings
- A CRASH COURSE ON STABLE RANGE, CANCELLATION, SUBSTITUTION AND EXCHANGE
- RINGS IN WHICH ELEMENTS ARE UNIQUELY THE SUM OF AN IDEMPOTENT AND A UNIT
- Inverse limits of rings and multiplier rings
- On the Structure of Algebraic Algebras and Related Rings
