Existence of Gorenstein Projective Resolutions and Tate Cohomology

Abstract

Existence of proper Gorenstein projective resolutions and Tate cohomology is proved over rings with a dualizing complex. The proofs are based on Bousfield Localization which is originally a method from algebraic topology. 

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Cite this paper

@inproceedings{Jrgensen2010ExistenceOG, title={Existence of Gorenstein Projective Resolutions and Tate Cohomology}, author={Peter J\orgensen}, year={2010} }