The second Hilbert coefficient of modules with almost maximal depth
Abstract
Let M = \ Mn \ be a good q-filtration of a finitely generated R-module M of dimension d, where (R,m) is a local ring and q is an m-primary ideal of R. In case depth(M) ≥ d-1, we give an upper bound for the second Hilbert coefficient e2(M) generalizing results by Huckaba-Marley and Rossi-Valla proved assuming that M is Cohen-Macaulay. We also give a condition for the equality, which relates to the depth of the associated graded module grM(M). A lower bound on e2(M) is proved generalizing a result by Rees and Narita.
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