Computing the core of ideals in arbitrary characteristic

Abstract

Let R be a local Gorenstein ring with infinite residue field of arbitrary characteristic. Let I be an R--ideal with g= I >0, analytic spread , and let J be a minimal reduction of I. We further assume that I satisfies G and R/Ij ≥ R/I -j+1 for 1 ≤ j ≤ -g. The question we are interested in is whether I=Jn+1: Σb ∈ I (J,b)n for n 0. In the case of analytic spread one Polini and Ulrich show that this is true with even weaker assumptions ([Theorem 3.4]PU). We give a negative answer to this question for higher analytic spreads and suggest a formula for the core of such ideals.