Bounds on Multigraded Regularity

Abstract

Multigraded Castelnuovo--Mumford regularity of a module M over the total coordinate ring S of a smooth projective toric variety X is a region reg M ⊂ Pic X invariant under translation by the nef cone Nef X. We prove that the multigraded regularity of a finitely generated faithful module is contained in a translate of Nef X determined by the degrees of the generators of M, and thus contains only finitely many minimal elements. We show that this condition can fail even for cyclic modules if M has torsion and the rank of the Picard group is at least two. As an application, we exhibit asymptotic bounds for the multigraded regularity of powers of ideals. For I an ideal in S, we bound reg(In) by proving that it contains a translate of reg S and is contained in a translate of Nef X, where each bound translates by a fixed vector as n increases.