On the first generalized Hilbert coefficient and depth of associated graded rings

Abstract

Let (R,m) be a d-dimensional Cohen-Macaulay local ring with infinite residue field. Let I be an ideal of R that has analytic spread (I)=d, satisfies the Gd condition, the weak Artin-Nagata property ANd-2- and depth(R/I)≥ 1, R/I . In this paper, we show that if j1(I) = λ (I/J) +λ [R/(Jd-1 :R I+(Jd-2 :RI+I) :R, m∞)]+1, then depth(G(I))≥ d -1 and rJ(I)≤ 2, where J is a general minimal reduction of I. In addition, we extend the result by Sally who has studied the depth of associated graded rings and minimal reductions for an ,m-primary ideals.