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Tilting Modules and Tilting Torsion Theories

✍ Scribed by R. Colpi; J. Trlifaj

Publisher
Elsevier Science
Year
1995
Tongue
English
Weight
968 KB
Volume
178
Category
Article
ISSN
0021-8693

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✦ Synopsis

We generalize basic results about classical tilting modules and partial tilting modules to the infinite dimensional case, over an arbitrary ring (R). The methods employed combine classical techniques of representation theory of finite dimensional algebras with new techniques of the theory of *-modules. Using a generalization of the Bongartz lemma, we characterize tilting torsion theories in Mod- (R), i.e., torsion theories induced by (infinitely generated) tilting modules. We investigate lattices (\left[\operatorname{Gen}(P), P^{\perp}\right]) of torsion classes induced by partial tilting modules (P). Applying our results to tilting torsion classes, we prove a version of the Brenner-Butler theorem, and a gencralization of the Assem-Snales theorem to the case when (R) is artinian. of 1995 Academic Press, Inc.

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