The Briancon-Skoda Theorem and Coefficient Ideals for Non m-Primary Ideals

Abstract

We generalize a Briancon-Skoda type theorem first studied by Aberbach and Huneke. With some conditions on a regular local ring (R,) containing a field, and an ideal I of R with analytic spread and a minimal reduction J, we prove that for all w ≥ -1, I+w ⊂eq Jw+1 a (I,J), where a(I,J) is the coefficient ideal of I relative to J, i.e. the largest ideal b such that Ib=Jb. Previously, this result was known only for -primary ideals.