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Approximations with modules having linear resolutions

✍ Scribed by Roberto Martínez-Villa; Dan Zacharia

Book ID
104140718
Publisher
Elsevier Science
Year
2003
Tongue
English
Weight
218 KB
Volume
266
Category
Article
ISSN
0021-8693

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✦ Synopsis

Let Λ be a Koszul algebra over a field K. We study in this paper a class of modules closely related to the Koszul modules called weakly Koszul modules. It turns out that these modules have some special filtrations with modules having linear resolutions and therefore easy to describe minimal projective resolutions. We prove that if the Koszul dual of a finite-dimensional Koszul algebra is Noetherian then every finitely generated graded module has a weakly Koszul syzygy and as a consequence a rational Poincaré series. If Λ is selfinjective Koszul, we prove that the stable part of each connected component of the graded Auslander-Reiten quiver containing a weakly Koszul module is of the form ZA ∞ , and if the Koszul dual of Λ is Noetherian, then every component has its stable part of the form ZA ∞ .

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