Counting numerical semigroups by genus and some cases of a question of Wilf.
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Publication:436083
DOI10.1016/J.JPAA.2011.10.038zbMATH Open1255.20054OpenAlexW1982536303MaRDI QIDQ436083
Publication date: 30 July 2012
Published in: Journal of Pure and Applied Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jpaa.2011.10.038
Exact enumeration problems, generating functions (05A15) Commutative semigroups (20M14) The Frobenius problem (11D07)
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- Representation of numerical semigroups by Dyck paths.
- Fibonacci-like behavior of the number of numerical semigroups of a given genus.
- Constructions of generalized Sidon sets.
- Towards a better understanding of the semigroup tree
- The Postage Stamp Problem and Essential Subsets in Integer Bases
- COUNTING NUMERICAL SEMIGROUPS WITH SHORT GENERATING FUNCTIONS
- SYSTEMS OF INEQUALITIES AND NUMERICAL SEMIGROUPS
- Upper bounds for finite additive $2$-bases
- On the linear diophantine problem of Frobenius.
- A Circle-Of-Lights Algorithm for the "Money-Changing Problem"
- Solving a linear equation in a set of integers I
- On certain n-sheeted coverings of curves and numerical semigroups which cannot be realized as weierstrass semigroups
- Generalized Ehrhart polynomials
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