Local cohomology under small perturbations
Abstract
Let (R,m) be a Noetherian local ring and I an ideal of R. We study how local cohomology modules with support in m change for small perturbations J of I, that is, for ideals J such that I J mN for large N, under the hypothesis that I and J share the same Hilbert function. As one of our main results, we show that if R/I is generalized Cohen-Macaulay, then the local cohomology modules of R/J are isomorphic to the corresponding local cohomology modules of R/I, except possibly the top one. In particular, this answers a question raised by Quy and V. D. Trung. Our approach also allows us to prove that if R/I is Buchsbaum, then so is R/J. Finally, under some additional assumptions, we show that if R/I satisfies Serre's property (Sn), then so does R/J.
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