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Duality for Koszul Homology over Gorenstein Rings

We study Koszul homology over Gorenstein rings. If an ideal is strongly Cohen-Macaulay, the Koszul homology algebra satisfies Poincaré duality. We prove a version of this duality which holds for all ideals and allows us to give two criteria for an ideal to be strongly Cohen-Macaulay. The first can be compared to a result of Hartshorne and Ogus; the second is a generalization of a result of Herzog, Simis, and Vasconcelos using sliding depth.

preprint2011arXivOpen access
Claudia MillerHamidreza RahmatiJanet Striuli
math.AC
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Claudia MillerHamidreza RahmatiJanet Striuli

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