The K\"ahler Different of a Set of Points in Pm×Pn

Abstract

Given an ACM set X of points in a multiprojective space Pm×Pn over a field of characteristic zero, we are interested in studying the K\"ahler different and the Cayley-Bacharach property for X. In P1×P1, the Cayley-Bacharach property agrees with the complete intersection property and it is characterized by using the K\"ahler different. However, this result fails to hold in Pm×Pn for n>1 or m>1. In this paper we start an investigation of the K\"ahler different and its Hilbert function and then prove that X is a complete intersection of type (d1,...,dm,d'1,...,d'n) if and only if it has the Cayley-Bachrach property and the K\"ahler different is non-zero at a certain degree. When X has the ()-property, we characterize the Cayley-Bacharach property of X in terms of its components under the canonical projections.