On associated graded modules of maximal Cohen-Macaulay modules over hypersurface rings
Abstract
Let (A,m) be a hypersurface ring with dimension d, and M a MCM A-module with red(M)≤ 2 and μ(M)=2 or 3 then we have proved that depth G(M)≥ d-μ(M)+1. If e(A)=3 and μ(M)=4 then in this case we have proved that depthG(M)≥ d-3. Next we consider the case when e(M)=μ(M)i(M)+1 and prove that depth G(M)≥ d-1. When A = Q/(f) where Q = k[[X1,·s, Xd+1]] then we give estimates for G(M) in terms of a minimal presentation of M. Our paper is the first systematic study of depth of associated graded modules of MCM modules over hypersurface rings.
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