Complete intersections in simplicial toric varieties

Abstract

Given a set A = \a1,…,an\ ⊂ Nm of nonzero vectors defining a simplicial toric ideal I A ⊂ k[x1,...,xn], where k is an arbitrary field, we provide an algorithm for checking whether I A is a complete intersection. This algorithm does not require the explicit computation of a minimal set of generators of I A. The algorithm is based on the application of some new results concerning toric ideals to the simplicial case. For homogenous simplicial toric ideals, we provide a simpler version of this algorithm. Moreover, when k is an algebraically closed field, we list all ideal-theoretic complete intersection simplicial projective toric varieties that are either smooth or have one singular point.