Abstract:
This paper investigates the projective closure of simplicial affine semigroups in Nd, d≥2. We present a characterization of the Cohen-Macaulay property for the projective closure of these semigroups using Gröbner bases. Additionally, we establish a criterion, based on Gröbner bases, for determining the Buchsbaum property of non-Cohen-Macaulay projective closures of numerical semigroup rings. Lastly, we introduce the concept of k-lifting for simplicial affine semigroups in Nd, and investigate its relationship with the original simplicial affine semigroup.