Bounds on the Ratliff-Rush Index and the Castelnuovo-Mumford Regularity

Abstract

Let (R, m) be a Cohen-Macaulay local ring of dimension d ≥ 2, and I an m-primary ideal of R. Denote rJ(I) as the reduction number of I with respect to a minimal reduction J of I, and (I) as the Ratliff-Rush index of I. We establish upper bounds on (I) in terms of Hilbert coefficients ei(I) for 0 ≤ i ≤ d+1, and rJ(I). Suppose IrJ(I) ≠ IrJ(I). We prove that (I) ≤ rJ(I)-1+(-1)d+1(ed+1(I)-ed+1(I)). When d=2, we prove that (I) ≤ rJ(I) -1 +(e2(I)-1)e2(I)-e3(I). This established bound on (I) consequently leads to a bound on the Castelnuovo-Mumford regularity of the associated graded ring of I. We also determine bound on (I) in two-dimensional Buchsbaum rings with positive depth.

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