On the arithmetically Cohen-Macaulay property for sets of points in multiprojective spaces

Abstract

Published version: We study the arithmetically Cohen-Macaulay (ACM) property for finite sets of points in multiprojective spaces, especially ( P1)n. A combinatorial characterization, the ()-property, is known in P1 × P1. We propose a combinatorial property, (n), that directly generalizes the ()-property to ( P1)n for larger n. We show that X is ACM if and only if it satisfies the (n)-property. The main tool for several of our results is an extension to the multiprojective setting of certain liaison methods in projective space. Corrigendum: We correct a mistake in the cited paper. It introduced a combinatorial property, the (n)-property, for a finite set of points X in ( P1)n and claimed that this property holds if and only if X is ACM. In fact X being ACM is a sufficient condition for the (n)-property, but we only prove that it is necessary when n=3, and we give a counterexample when n=4.