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If is an ideal in a Gorenstein ring , and is Cohen-Macaulay, then the same is true for any linked ideal ; but such statements hold for residual intersections of higher codimension only under restrictive hypotheses, not satisfied even by ideals as simple as the ideal of minors of a generic matrix when . In this paper we initiate the study of a different sort of Cohen-Macaulay property that holds for certain general residual intersections of the maximal (interesting) codimension, one less than the analytic spread of . For example, suppose that is the residual intersection of by general quadratic forms in . In this situation we analyze and show that is a self-dual maximal Cohen-Macaulay -module with linear free resolution over . The technical heart of the paper is a result about ideals of analytic spread 1 whose high powers are linearly presented.
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Hochster, Melvin; Ulrich, Bernd (, Journal of Algebra)null (Ed.)
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Polini, Claudia; Trung, Ngo Viet; Ulrich, Bernd; Validashti, Javid (, Mathematische Annalen)null (Ed.)
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Kustin, Andrew R.; Polini, Claudia; Ulrich, Bernd (, Proceedings of the London Mathematical Society)
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Eisenbud, D.; Ulrich, B. (, Journal für die reine und angewandte Mathematik)
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Polini, C.; Ulrich, B.; Vasconcelos, W.V.; Villarreal, R.H. (, Journal of Pure and Applied Algebra)
