Bounds for the reduction number of primary ideal in dimension three
Abstract
Let (R,m) be a Cohen-Macaulay local ring of dimension d≥ 3 and I an m-primary ideal of R. Let rJ(I) be the reduction number of I with respect to a minimal reduction J of I. Suppose depth G(I)≥ d-3. We prove that rJ(I)≤ e1(I)-e0(I)+λ(R/I)+1+(e2(I)-1)e2(I)-e3(I), where ei(I) are Hilbert coefficients. Suppose d=3 and depth G(It)>0 for some t≥ 1. Then we prove that rJ(I)≤ e1(I)-e0(I)+λ(R/I)+t.
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