We characterize numerical semigroups of embedding dimension three having the same catenary and tame degrees.García Sánchez is supported by the projects MTM2010-15595, FQM-343, FQM-5849, and FEDER funds. The contents of this article are part of Viola’s master’s thesis. Part of this work was done while she visited the Univerisidad de Granada under the European Erasmus mobility program
The catenary degree is an invariant that measures the distance between factorizations of elements wi...
Let N be the set of nonnegative integer numbers. A plane monoid is a submonoid of (N-2, +). Let M be...
Electronic version of an article published as International Journal of Number Theory, 2017, Vol. 13...
Electronic version of an article published as Journal of Algebra and Its Applications, 15, 1, 2016, ...
Given m E N, a numerical semigroup with multiplicity m is called a packed numerical semigroup if it...
ABSTRACT. We construct an algorithm which computes the catenary and tame degree of a numerical semig...
Given a numerical semigroup S(A), generated by A = {a,b,N} ⊂ N with 0 < a < b < N and gcd(a,b,N) = 1...
AbstractIn this paper, we characterize those numerical semigroups containing 〈n1,n2〉. From this char...
Let $fneq1,3$ be a positive integer. We prove that there exists a numerical semigroup $S$ with emb...
AbstractWe compute the number of elements of a minimal system of generators for the congruence of a ...
This paper examines in a new way some known facts about numerical semigroups especially when the num...
In the article [4] two new identities for the degree of syzygies are given. We present an algebraic ...
We characterise the numerical semigroups with a monotone Ap\'ery set (MANS-semigroups for abbreviate...
Funding for open access charge: Universidad de Granada / CBUAIf m is an element of N \ (0, 1) and A ...
summary:We study numerical semigroups $S$ with the property that if $m$ is the multiplicity of $S$...
The catenary degree is an invariant that measures the distance between factorizations of elements wi...
Let N be the set of nonnegative integer numbers. A plane monoid is a submonoid of (N-2, +). Let M be...
Electronic version of an article published as International Journal of Number Theory, 2017, Vol. 13...
Electronic version of an article published as Journal of Algebra and Its Applications, 15, 1, 2016, ...
Given m E N, a numerical semigroup with multiplicity m is called a packed numerical semigroup if it...
ABSTRACT. We construct an algorithm which computes the catenary and tame degree of a numerical semig...
Given a numerical semigroup S(A), generated by A = {a,b,N} ⊂ N with 0 < a < b < N and gcd(a,b,N) = 1...
AbstractIn this paper, we characterize those numerical semigroups containing 〈n1,n2〉. From this char...
Let $fneq1,3$ be a positive integer. We prove that there exists a numerical semigroup $S$ with emb...
AbstractWe compute the number of elements of a minimal system of generators for the congruence of a ...
This paper examines in a new way some known facts about numerical semigroups especially when the num...
In the article [4] two new identities for the degree of syzygies are given. We present an algebraic ...
We characterise the numerical semigroups with a monotone Ap\'ery set (MANS-semigroups for abbreviate...
Funding for open access charge: Universidad de Granada / CBUAIf m is an element of N \ (0, 1) and A ...
summary:We study numerical semigroups $S$ with the property that if $m$ is the multiplicity of $S$...
The catenary degree is an invariant that measures the distance between factorizations of elements wi...
Let N be the set of nonnegative integer numbers. A plane monoid is a submonoid of (N-2, +). Let M be...
Electronic version of an article published as International Journal of Number Theory, 2017, Vol. 13...