Buchsbaumness of the associated graded rings of filtration

Abstract

Let (A,m) be a Noetherian local ring of dimension d>0 and I an I-primary ideal of A. In this paper, we discuss a sufficient condition, for the Buchsbaumness of the local ring A to be passed onto the associated graded ring of filtration. Let I denote an I-good filtration. We prove that if A is Buchsbaum and the I-invariant, I(A) and I(G(I)), coincide then the associated graded ring G(I) is Buchsbaum. As an application of our result, we indicate an alternative proof of a conjecture, of Corso on certain boundary conditions for Hilbert coefficients.