On gluing semigroups in Nn and the consequences

Abstract

A semigroup C in Nn is a gluing of A and B if its finite set of generators C splits into two parts, C=k1A k2B with k1,k2≥ 1, and the defining ideals of the corresponding semigroup rings satisfy that IC is generated by IA+IB and one extra element. Two semigroups A and B can be glued if there exist positive integers k1,k2 such that, for C=k1A k2B, C is a gluing of A and B. Although any two numerical semigroups, namely semigroups in dimension n=1, can always be glued, it is no longer the case in higher dimensions. In this paper, we give necessary and sufficient conditions on A and B for the existence of a gluing of A and B, and give examples to illustrate why they are necessary. These generalize and explain the previous known results on existence of gluing. We also prove that the glued semigroup C inherits the properties like Gorenstein or Cohen-Macaulay from the two parts A and B.