A Less Restrictive Briancon-Skoda Theorem with Coefficients

Abstract

The Briancon-Skoda theorem in its many versions has been studied by algebraists for several decades. In this paper, under some assumptions on an F-rational local ring (R,), and an ideal I of R of analytic spread and height g < , we improve on two theorems by Aberbach and Huneke. Let J be a reduction of I. We first give results on when the integral closure of I is contained in the product J I-1, where I-1 is the intersection of the primary components of I of height ≤ -1. In the case that R is also Gorenstein, we give results on when the integral closure of I-1 is contained in J.