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Tilting theory plays an important role in the representation theory of coalgebras. This paper seeks how to apply the theory of localization and colocalization to tilting torsion theory in the category of comodules. In order to better understand the process, we give the (co)localization for morphisms, (pre)covers and special precovers. For that reason, we investigate the (co)localization in tilting torsion theory for coalgebras.

Localization in Prime Noetherian p.i. Rings.

Amiram Braun, L.W. Small (1986)

Mathematische Zeitschrift

Localization of cliques and model theory. (Localisation des cliques et théorie des modèles.)

Aribaud, François, Malliavin, Marie Paule (1994)

Portugaliae Mathematica

Localizations in Categories of Modules. III.

Kiiti Morita (1971)

Mathematische Zeitschrift

Localizations of Hereditary Noetherian Rings

J. C. Robson (1973)

Publications du Département de mathématiques (Lyon)

Locally adequate semigroup algebras

Yingdan Ji, Yanfeng Luo (2016)

Open Mathematics

We build up a multiplicative basis for a locally adequate concordant semigroup algebra by constructing Rukolaĭne idempotents. This allows us to decompose the locally adequate concordant semigroup algebra into a direct product of primitive abundant [...] 0-J* $0 - 𝒥 *$ -simple semigroup algebras. We also deduce a direct sum decomposition of this semigroup algebra in terms of the [...] ℛ* $ℛ *$ -classes of the semigroup obtained from the above multiplicative basis. Finally, for some special cases, we provide a description...

Locally compact Baer rings.

Ursul, Mihail (2004)

Acta Universitatis Apulensis. Mathematics - Informatics

Locally compact topologically nil and monocompact PI-rings.

Ursul, M.I. (2001)

Beiträge zur Algebra und Geometrie

Locally free modules

Wolfson, Kenneth G. (1990)

Portugaliae mathematica

Locally free modules over arithmetic orders.

A. Fröhlich (1975)

Journal für die reine und angewandte Mathematik

Locally linearly compact semisimple rings.

Sister Merilyn Ryan (1980)

Journal für die reine und angewandte Mathematik

Locally well generated homotopy categories of complexes.

Stovicek, Jan (2010)

Documenta Mathematica

Loewy coincident algebra and $Q F$ -3 associated graded algebra

Hiroyuki Tachikawa (2009)

Czechoslovak Mathematical Journal

We prove that an associated graded algebra $R_{G}$ of a finite dimensional algebra $R$ is $Q F$ (= selfinjective) if and only if $R$ is $Q F$ and Loewy coincident. Here $R$ is said to be Loewy coincident if, for every primitive idempotent $e$ , the upper Loewy series and the lower Loewy series of $R e$ and $e R$ coincide. $Q F$ -3 algebras are an important generalization of $Q F$ algebras; note that Auslander algebras form a special class of these algebras. We prove that for a Loewy coincident algebra $R$ , the associated graded algebra...

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Displaying 61 – 80 of 86

Localisation of a commutativity condition for $s$ -unital rings.

Localisations et anneaux semi-noethériens à droite

Localisations premières

Localization and Artinian Quotient Rings.

Localization and colocalization in tilting torsion theory for coalgebras