On the regularity index of the minimum distance function in projective nested Cartesian codes

Abstract

Let X be a projective nested product of fields and let δX(d) be the minimum distance in degree d≥ 1 of the projective nested Cartesian code CX(d). The regularity index reg(δX) of the minimum distance function δX is the minimum integer d0≥ 0 such that δX(d)=1 for d≥ d0. We give a formula for reg(δX) by determining an indicator function of least degree for each point of X and using the fact that reg(δX) is the v-number of the vanishing ideal IX of X. Then we give an arithmetical criterion that characterizes when X is Cayley--Bacharach.