Add to ORKGA numerical semigroup is a subset, S of the non-negative integers, Z+ which contains zero, is closed under addition, and whose complement in Z+ is finite. We discuss the basic properties of numerical semigroups as well as associated structures such as relative ideals. Further, we examine several finite subsets of S including the Apery Set and two of its subsets. Relationships between these subsets of S will allow us to give an equivalent definition for S to be symmetric as well as a necessary condition for S to be almost symmetric
Producción CientíficaWe give two algorithmic procedures to compute the whole set of almost symmetric...
AbstractLet S be a numerical semigroup and let p be a positive integer. Then the quotient Sp={x∈N∣px...
We thank the anonymous referees for their detailed suggestions and comments, which have greatly imp...
A numerical semigroup is a submonoid of non-negative integers whose complement on this set is finite...
summary:We study numerical semigroups $S$ with the property that if $m$ is the multiplicity of $S$...
summary:We study numerical semigroups $S$ with the property that if $m$ is the multiplicity of $S$...
The concepts of an Apéry set is important role in numerical semi-group theory. In this paper we cha...
Let S and T be numerical semigroups and let k be a positive integer. We say that S is the quotient o...
We characterise the numerical semigroups with a monotone Ap\'ery set (MANS-semigroups for abbreviate...
This work presents applications of numerical semigroups in Algebraic Geometry, Number Theory, and Co...
This thesis is devoted to the study of the theory of numerical semigroups. First, the focus is on sa...
In this paper, we give some results on Apéry sets of Symmetric Numerical Semigroups with e(S) = 2....
AbstractWe study those numerical semigroups that are intersections of symmetric numerical semigroups...
AbstractWe compute the number of elements of a minimal system of generators for the congruence of a ...
A generalization of a non-symmetric numerical semigroup generated by three elements (Jiryo Komeda) K...
Producción CientíficaWe give two algorithmic procedures to compute the whole set of almost symmetric...
AbstractLet S be a numerical semigroup and let p be a positive integer. Then the quotient Sp={x∈N∣px...
We thank the anonymous referees for their detailed suggestions and comments, which have greatly imp...
A numerical semigroup is a submonoid of non-negative integers whose complement on this set is finite...
summary:We study numerical semigroups $S$ with the property that if $m$ is the multiplicity of $S$...
summary:We study numerical semigroups $S$ with the property that if $m$ is the multiplicity of $S$...
The concepts of an Apéry set is important role in numerical semi-group theory. In this paper we cha...
Let S and T be numerical semigroups and let k be a positive integer. We say that S is the quotient o...
We characterise the numerical semigroups with a monotone Ap\'ery set (MANS-semigroups for abbreviate...
This work presents applications of numerical semigroups in Algebraic Geometry, Number Theory, and Co...
This thesis is devoted to the study of the theory of numerical semigroups. First, the focus is on sa...
In this paper, we give some results on Apéry sets of Symmetric Numerical Semigroups with e(S) = 2....
AbstractWe study those numerical semigroups that are intersections of symmetric numerical semigroups...
AbstractWe compute the number of elements of a minimal system of generators for the congruence of a ...
A generalization of a non-symmetric numerical semigroup generated by three elements (Jiryo Komeda) K...
Producción CientíficaWe give two algorithmic procedures to compute the whole set of almost symmetric...
AbstractLet S be a numerical semigroup and let p be a positive integer. Then the quotient Sp={x∈N∣px...
We thank the anonymous referees for their detailed suggestions and comments, which have greatly imp...