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Type: Article
Stable projective homotopy theory of modules, tails, and Koszul duality
Abstract:
A contravariant functor is constructed from the stable projective homotopy theory of finitely generated graded modules over a finite-dimensional algebra to the derived category of its Yoneda algebra modulo finite complexes of modules of finite length. If the algebra is Koszul with a noetherian Yoneda algebra, then the constructed functor is a duality between triangulated categories. If the algebra is self-injective, then stable homotopy theory specializes trivially to stable module theory. In particular, for an exterior algebra the constructed duality specializes to (a contravariant analog of) the Bernstein-Gelfand-Gelfand correspondence
A contravariant functor is constructed from the stable projective homotopy theory of finitely generated graded modules over a finite-dimensional algebra to the derived category of its Yoneda algebra modulo finite complexes of modules of finite length. If the algebra is Koszul with a noetherian Yoneda algebra, then the constructed functor is a duality between triangulated categories. If the algebra is self-injective, then stable homotopy theory specializes trivially to stable module theory. In particular, for an exterior algebra the constructed duality specializes to (a contravariant analog of) the Bernstein-Gelfand-Gelfand correspondence
Keywords: Koszul duality; Stable homotopy theory of modules; Tails; Totally linear complex; Weakly Koszul
MSC: 16S37 (16E05 18E30 18E35)
Journal: Commications in Algebra
ISSN: 0092-7872
Year: 2010
Volume: 38
Number: 10
Pages: 3941--3973
Created: 2012-12-11 16:38:21
Modified: 2014-02-12 16:36:57
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