The complexity of a numerical semigroup

Abstract

Let S and be numerical semigroups. A numerical semigroup S is an I()- semigroup if S \0\ is an ideal of . We will denote by J()=\S S is an I()-semigroup \. We will say that is an ideal extension of S if S∈ J(). In this work, we present an algorithm that allows to build all the ideal extensions of a numerical semigroup. We can recursively denote by J0(N)=N, J1(N)=J(N) and Jk+1(N)=J(Jk(N)) for all k∈ N. The complexity of a numerical semigroup S is the minimun of the set \k∈ N S ∈ Jk(N)\. In addition, we will give an algorithm that allows us to compute all the numerical semigroups with fixed multiplicity and complexity.