Comparing powers and symbolic powers of ideals

Abstract

We develop tools to study the problem of containment of symbolic powers I(m) in powers Ir for a homogeneous ideal I in a polynomial ring k[ PN] in N+1 variables over an algebraically closed field k. We obtain results on the structure of the set of pairs (r,m) such that I(m)⊂eq Ir. As corollaries, we show that I2 contains I(3) whenever S is a finite generic set of points in P2 (thereby giving a partial answer to a question of Huneke), and we show that the containment theorems of Ein-Lazarsfeld-Smith and Hochster-Huneke are optimal for every fixed dimension and codimension.