Uniform Harbourne-Huneke Bounds via Flat Extensions

Abstract

Over an arbitrary field F, Harbourne conjectured that I(N (r-1)+1) ⊂eq Ir for all r>0 and all homogeneous ideals I in S = F [PN] = F [x0, …, xN]. The conjecture has been disproven for select values of N 2: first by Dumnicki, Szemberg, and Tutaj-Gasi\'nska in characteristic zero, and then by Harbourne and Seceleanu in odd positive characteristic. However, the ideal containments above do hold when, for instance, I is a monomial ideal in S. As a sequel to (arXiv:1510.02993), we present criteria for containments of type I(N (r-1)+1) ⊂eq Ir for all r>0 and certain classes of ideals I in a prodigious class of normal rings. Of particular interest is a result for monomial primes in tensor products of affine semigroup rings. Indeed, we explain how to give effective multipliers N in several cases including: the D-th Veronese subring of any polynomial ring F [x1, …, xn] (n 1); and the extension ring F [x1, …, xn, z]/(zD - x1 ·s xn) of F[x1, …, xn].