Multiprojective spaces and the arithmetically Cohen-Macaulay property

Abstract

In this paper we study the arithmetically Cohen-Macaulay (ACM) property for sets of points in multiprojective spaces. Most of what is known is for P1× P1 and, more recently, in ( P1)r. In P1× P1 the so called inclusion property characterizes the ACM property. We extend the definition in any multiprojective space and we prove that the inclusion property implies the ACM property in Pm× Pn. In such an ambient space it is equivalent to the so-called ()-property. Moreover, we start an investigation of the ACM property in P1× Pn. We give a new construction that highlights how different the behavior of the ACM property is in this setting.