Associated graded rings of the filtration of tight closure of powers of parameter ideals

Abstract

Let I be an ideal generated by a system of parameters in an excellent Cohen-Macaulay local domain. We show that the associated graded ring G*(I) of the filtration \(In)*: n∈ N\ is Cohen-Macaulay. We prove that if R is an excellent Buchsbaum local domain then G*(I) is a Buchsbaum module over the Rees ring R*(I)=n∈ N(In)*. We provide quick proofs of well-known results of I. Aberbach, Huneke-Itoh and Huneke-Hochster about the filtration \(In)*: n∈ N\ in excellent local domains. An important tool used in the proofs is a deep result due to M. Hochster and C. Huneke which states that the absolute integral closure of an excellent local domain is a big Cohen-Macaulay algebra. We compute the tight closure of In where I is generated by homogeneous system of parameters having the same degree e in the hypersurface ring R=Fp[X0,… ,Xd]/(X0r+·s+Xdr). In such cases we prove that G*(I) is Cohen-Macaulay. We provide conditions on r, d, e for the Rees algebra R*(I) to be Cohen-Macaulay.