The Hilbert functions of ACM sets of points in Pn1 x ... x Pnk

Abstract

The Hilbert functions of sets of distinct points in Pn have been characterized. We show that if we restrict to sets of distinct of points in Pn1 x ... x Pnk that are also arithmetically Cohen-Macaulay (ACM for short), then there is a natural generalization of this result. We begin by determining the possible values for the invariants K-dim R/Ix and depth R/Ix, where R/Ix is the coordinate ring associated to a set of distinct points X in Pn1 x ... x Pnk. At the end of this paper we give a new characterization of ACM sets of points in P1 x P1.

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