On the Hilbert coefficients, depth of associated graded rings and reduction numbers

Abstract

Let (R,m) be a d-dimensional Cohen-Macaulay local ring, I an m-primary ideal of R and J=(x1,...,xd) a minimal reduction of I. We show that if Jd-1=(x1,...,xd-1) and Σn=1∞λ(In+1 Jd-1)/(JIn Jd-1)=i where i=0,1, then depth G(I)≥d-i-1. Moreover, we prove that if e2(I) = Σn=2∞ (n-1) λ (In/JIn-1)-2; or if I is integrally closed and e2(I) = Σn=2∞ (n-1)λ(In/JIn-1)-i where i=3,4, then e1(I) = Σn=1∞ λ(In / JIn-1)-1. In addition, we show that r(I) is independent. Furthermore, we study the independence of r(I) with some other conditions.