On the computation of the Ratliff-Rush closure, associated graded ring and invariance of a length
Abstract
Let (R,) be a Cohen-Macaulay local ring of positive dimension d and infinite residue field. Let I be an -primary ideal of R and J be a minimal reduction of I. In this paper we show that if Ik=Ik and J In=JIn-1 for all n≥ k+2, then In=In for all n≥ k. As a consequence, we can deduce that if rJ(I)=2, then I=I if and only if In=In for all n≥ 1. Moreover, we recover some main results [Cpv] and [G]. Finally, we give a counter example for question 3 of [P1].
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