Existence of Gorenstein projective resolutions and Tate cohomology

Peter Jørgensen

doi:10.4171/JEMS/72

Existence of Gorenstein projective resolutions and Tate cohomology

^*Corresponding author for this work

Research output: Contribution to journal/Conference contribution in journal/Contribution to newspaper › Review › Research › peer-review

53 Citations (Scopus)

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.

Original language	English
Journal	Journal of the European Mathematical Society
Volume	9
Issue	1
Pages (from-to)	59-76
Number of pages	18
ISSN	1435-9855
DOIs	https://doi.org/10.4171/JEMS/72
Publication status	Published - 2007
Externally published	Yes

Keywords

Dualizing complex
Gorenstein homological algebra
Gorenstein projective precover

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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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KW - Gorenstein projective precover

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DO - 10.4171/JEMS/72

M3 - Review

AN - SCOPUS:33845508074

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JF - Journal of the European Mathematical Society

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Existence of Gorenstein projective resolutions and Tate cohomology

Abstract

Keywords

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