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Autore principale: Bras-Amorós, Maria
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2503.14664
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author Bras-Amorós, Maria
author_facet Bras-Amorós, Maria
contents We present a new algorithm to explore or count the numerical semigroups of a given genus which uses the unleaved version of the tree of numerical semigroups. In the unleaved tree there are no leaves rather than the ones at depth equal to the genus in consideration. For exploring the unleaved tree we present a new encoding system of a numerical semigroup given by the gcd of its left elements and its shrinking, that is, the semigroup generated by its left elements divided by their gcd. We show a method to determine the right generators and strong generators of a semigroup by means of the gcd and the shrinking encoding, as well as a method to encode a semigroup from the encoding of its parent or of its predecessor sibling. With the new algorithm we obtained $n_{76}=29028294421710227$ and $n_{77}=47008818196495180$.
format Preprint
id arxiv_https___arxiv_org_abs_2503_14664
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Exploring the unleaved tree of numerical semigroups up to a given genus
Bras-Amorós, Maria
Combinatorics
Discrete Mathematics
Commutative Algebra
06F05, 20M14, 05A99, 68W30
We present a new algorithm to explore or count the numerical semigroups of a given genus which uses the unleaved version of the tree of numerical semigroups. In the unleaved tree there are no leaves rather than the ones at depth equal to the genus in consideration. For exploring the unleaved tree we present a new encoding system of a numerical semigroup given by the gcd of its left elements and its shrinking, that is, the semigroup generated by its left elements divided by their gcd. We show a method to determine the right generators and strong generators of a semigroup by means of the gcd and the shrinking encoding, as well as a method to encode a semigroup from the encoding of its parent or of its predecessor sibling. With the new algorithm we obtained $n_{76}=29028294421710227$ and $n_{77}=47008818196495180$.
title Exploring the unleaved tree of numerical semigroups up to a given genus
topic Combinatorics
Discrete Mathematics
Commutative Algebra
06F05, 20M14, 05A99, 68W30
url https://arxiv.org/abs/2503.14664