Counting numerical semigroups

Ernst Kunz; Rolf Waldi

arXiv:1410.7150·math.CO·October 28, 2014·Am. Math. Mon.·5 cites

Counting numerical semigroups

Ernst Kunz, Rolf Waldi

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TL;DR

This paper investigates formulas for counting elements within specific classes of numerical semigroups, aiming to deepen understanding of their enumeration and structural properties.

Contribution

It introduces new formulas or methods for counting numerical semigroups in particular classes, advancing the combinatorial understanding of these algebraic structures.

Findings

01

Derived formulas for counting numerical semigroups

02

Identified structural patterns in semigroup classes

03

Enhanced enumeration techniques for algebraic structures

Abstract

We are interested in formulas for the number of elements in certain classes of numerical semigroups

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Taxonomy

TopicsCommutative Algebra and Its Applications · Polynomial and algebraic computation · Advanced Combinatorial Mathematics