On associated graded modules of maximal Cohen-Macaulay modules over hypersurface rings

Abstract

Let A=Q/(f) where (Q,n) be a complete regular local ring of dimension d+1, f∈ nini+1 for some i≥ 2 and M an MCM A-module with e(M)=μ(M)i(M)+1 then we prove that depth G(M)≥ d-1. If (A,m) is a complete hypersurface ring of dimension d with infinite residue field and e(A)=3, let M be an MCM A-module with μ(M)=2 or 3 then we prove that depth G(M)≥ d-μ(M)+1. Our paper is the first systematic study of depth of associated graded modules of MCM modules over hypersurface rings.