Let S = a, b,N be a numerical semigroup generated by a, b,N ∈ N with 1 < a < b < N and gcd(a, b,N) = 1. The conductor of S, denoted by c(S) or c(a, b,N), is the minimum element of S such that c(S) + m ∈ S for all m ∈ N ∪ {0}. Some arithmetic-like links between 3-numerical semigroups were remarked by V. Arnold. For instance he gave links of the form $\displaystyle\frac{c(13, 32, 52)}{c(13, 33, 51)} = \displaystyle\frac{c(9, 43, 45) }{c(9, 42, 46)} = \displaystyle\frac{c(5, 35, 37)}{c(5, 34, 38)} = 2 or \displaystyle\frac{c(4, 20, 73)}{c(4, 19, 74)} = 4$. In this work several infinite families of 3-numerical semigroups with similar properties are given. These families have been found using a plane geometrical approach, known as L-shaped...
This paper is focused on numerical semigroups and presents a simple construction, that we call “dila...
Minimum distance diagrams, also known as L-shapes, have been used to study some properties related t...
AbstractWe compute the number of elements of a minimal system of generators for the congruence of a ...
Given a numerical semigroup S(A), generated by A = {a,b,N} ⊂ N with 0 < a < b < N and gcd(a,b,N) = 1...
A generalization of a non-symmetric numerical semigroup generated by three elements (Jiryo Komeda) K...
We will say that a numerical semigroup S is bounded by a cyclic monoid if there exist integer number...
Let H be a numerical semigroup with embedding dimension , type t(H), conductor c(H) and genus g(H). ...
AbstractIn this paper, we characterize those numerical semigroups containing 〈n1,n2〉. From this char...
In this paper, we characterize those numerical semigroups containing 〈n1,n2〉. From this characteriza...
We recall L-shapes, which are minimal distance diagrams, related to weighted 2-Cayley digraphs, and ...
We investigate numerical semigroups generated by any quadratic sequence with initial term zero and a...
We recall L-shapes, which are minimal distance diagrams, related to weighted 2-Cayley digraphs, and ...
AbstractLet H=〈a,b,c〉 be a numerical semigroup generated by three elements and let R=k[H] be its sem...
For a numerical semigroup, we encode the set of primitive elements that are larger than its Frobeniu...
In this work, we give parametrizations in terms of the Kunz coordinates of numerical semigroups with...
This paper is focused on numerical semigroups and presents a simple construction, that we call “dila...
Minimum distance diagrams, also known as L-shapes, have been used to study some properties related t...
AbstractWe compute the number of elements of a minimal system of generators for the congruence of a ...
Given a numerical semigroup S(A), generated by A = {a,b,N} ⊂ N with 0 < a < b < N and gcd(a,b,N) = 1...
A generalization of a non-symmetric numerical semigroup generated by three elements (Jiryo Komeda) K...
We will say that a numerical semigroup S is bounded by a cyclic monoid if there exist integer number...
Let H be a numerical semigroup with embedding dimension , type t(H), conductor c(H) and genus g(H). ...
AbstractIn this paper, we characterize those numerical semigroups containing 〈n1,n2〉. From this char...
In this paper, we characterize those numerical semigroups containing 〈n1,n2〉. From this characteriza...
We recall L-shapes, which are minimal distance diagrams, related to weighted 2-Cayley digraphs, and ...
We investigate numerical semigroups generated by any quadratic sequence with initial term zero and a...
We recall L-shapes, which are minimal distance diagrams, related to weighted 2-Cayley digraphs, and ...
AbstractLet H=〈a,b,c〉 be a numerical semigroup generated by three elements and let R=k[H] be its sem...
For a numerical semigroup, we encode the set of primitive elements that are larger than its Frobeniu...
In this work, we give parametrizations in terms of the Kunz coordinates of numerical semigroups with...
This paper is focused on numerical semigroups and presents a simple construction, that we call “dila...
Minimum distance diagrams, also known as L-shapes, have been used to study some properties related t...
AbstractWe compute the number of elements of a minimal system of generators for the congruence of a ...