Left Quotient Associative Pairs and Morita Invariant Properties
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Publication:3158249
DOI10.1081/AGB-120037419zbMath1075.16015OpenAlexW2172084112MaRDI QIDQ3158249
Mercedes Siles Molina, Miguel Gómez Lozano
Publication date: 21 January 2005
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1081/agb-120037419
Morita invarianceassociative pairsidempotent ringsmaximal left quotient ringsFountain-Gould left quotient ringsleft quotient pairs
Module categories in associative algebras (16D90) Torsion theories; radicals on module categories (associative algebraic aspects) (16S90)
Related Items (5)
Finite \(\mathbb{Z}\)-gradings of simple associative algebras. ⋮ The ideal of Lesieur-Croisot elements of Jordan pairs ⋮ Fountain-Gould left orders for associative pairs. ⋮ PI theory for associative pairs ⋮ Associative systems of left quotients.
Cites Work
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- Diagonalization in Jordan pairs
- Morita equivalence for idempotent rings
- Quadratic Jordan systems of Hermitian type
- Morita equivalence based on contexts for various categories of modules over associative rings
- Elementary groups and stability for Jordan pairs
- Goldie theorems for associative pairs
- Orders in primitive rings with non-zero socle and posner's theorem
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