On dynamic algorithms for factorization invariants in numerical monoids
From MaRDI portal
Publication:2981784
DOI10.1090/mcom/3160zbMath1385.20019arXiv1507.07435OpenAlexW957807994MaRDI QIDQ2981784
Thomas Barron, Roberto Pelayo, Christopher O'Neill
Publication date: 10 May 2017
Published in: Mathematics of Computation (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1507.07435
Related Items (16)
Delta sets for symmetric numerical semigroups with embedding dimension three ⋮ Delta sets for nonsymmetric numerical semigroups with embedding dimension three ⋮ Factorization length distribution for affine semigroups. I: Numerical semigroups with three generators ⋮ Numerical semigroups, polyhedra, and posets. III: Minimal presentations and face dimension ⋮ Length density and numerical semigroups ⋮ The computation of factorization invariants for affine semigroups ⋮ Factorization invariants in numerical monoids ⋮ Factoring in the Chicken McNugget Monoid ⋮ On divisor-closed submonoids and minimal distances in finitely generated monoids ⋮ On arithmetical numerical monoids with some generators omitted ⋮ An improved algorithm to compute the \(\omega\)-primality ⋮ Approximating length-based invariants in atomic Puiseux monoids ⋮ \(\omega \)-primality in arithmetic Leamer monoids ⋮ Augmented Hilbert series of numerical semigroups ⋮ Distances between Factorizations in the Chicken McNugget Monoid ⋮ Factorization invariants of Puiseux monoids generated by geometric sequences
Uses Software
Cites Work
- Unnamed Item
- Semigroup-theoretical characterizations of arithmetical invariants with applications to numerical monoids and Krull monoids.
- Delta sets of numerical monoids are eventually periodic.
- An algorithm to compute \(\omega\)-primality in a numerical monoid.
- Computation of delta sets of numerical monoids.
- Numerical semigroups.
- On the asymptotic behaviour of the number of distinct factorizations into irreducibles
- Decomposition of a numerical semigroup as an intersection of irreducible numerical semigroups.
- On factorization invariants and Hilbert functions
- Computation of the \(\omega\)-primality and asymptotic \(\omega\)-primality with applications to numerical semigroups.
- Delta sets for symmetric numerical semigroups with embedding dimension three
- On the set of elasticities in numerical monoids
- On the linearity of \(\omega\)-primality in numerical monoids.
- THE CATENARY AND TAME DEGREES ON A NUMERICAL MONOID ARE EVENTUALLY PERIODIC
- ON DELTA SETS OF NUMERICAL MONOIDS
- How Do You Measure Primality?
- The catenary and tame degree of numerical monoids
- Shorter Notes: Redei's Finiteness Theorem for Commutative Semigroups
This page was built for publication: On dynamic algorithms for factorization invariants in numerical monoids
