Multigraded regularity: coarsenings and resolutions

Abstract

Let S = k[x1,...,xn] be a Zr-graded ring with deg (xi) = ai ∈ Zr for each i and suppose that M is a finitely generated Zr-graded S-module. In this paper we describe how to find finite subsets of Zr containing the multidegrees of the minimal multigraded syzygies of M. To find such a set, we first coarsen the grading of M so that we can view M as a Z-graded S-module. We use a generalized notion of Castelnuovo-Mumford regularity, which was introduced by D. Maclagan and G. Smith, to associate to M a number which we call the regularity number of M. The minimal degrees of the multigraded minimal syzygies are bounded in terms of this invariant.

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