Vanishing Ideals of Parameterized Subgroups in a toric variety

Abstract

Let be a finite field and X be a complete simplicial toric variety over . We give an algorithm relying on elimination theory for finding generators of the vanishing ideal of a subgroup YQ parameterized by a matrix Q which can be used to study algebraic geometric codes arising from YQ. We give a method to compute the lattice L whose ideal IL is exactly I(YQ) under a mild condition. As applications, we give precise descriptions for the lattices corresponding to some special subgroups. We also prove a Nullstellensatz type theorem valid over finite fields, and share |Macaulay2| codes for our algorithms.