A regular unimodular triangulation of reflexive 2-supported weighted projective space simplices

Abstract

For each integer partition q with d parts, we denote by (1,q) the lattice simplex obtained as the convex hull in Rd of the standard basis vectors along with the vector -q. For q with two distinct parts such that (1,q) is reflexive and has the integer decomposition property, we establish a characterization of the lattice points contained in (1,q). We then construct a Gr\"obner basis with a squarefree initial ideal of the toric ideal defined by these simplices. This establishes the existence of a regular unimodular triangulation for reflexive 2-supported (1,q) having the integer decomposition property.