Numerical Semigroups: IMNS 2018
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Lieferzeit: 7-14 Werktage
- Artikel-Nr.: 10398380
Beschreibung
Bernardini, M., Counting numerical semigroups by genus and even gaps via Kunz-coordinate vectors.- Borzì A., Patterns on the numerical duplication.- Bouyalat, B. and El Baghdadi, S., Primality in semigroup rings.- Delgado, M., Conjecture of Wilf: A survey.- Eliahou, S. and Fromentin, J., Gapsets of small multiplicity.- Eto K., Generic toric ideals and row-factorization matrices in numerical semigroups.- Fel Leonig G., Symmetric (not Complete Intersection) Semigroups Generated by Six Elements.- Gimenez P. and Srinivasan H., Syzygies of numerical semigroup rings, a survey through examples.- Gotti F., Irreducibility and factorizations in monoid rings.- Gotti F. and Gotti M., On the molecules of numerical semigroups, Puiseux monoids, and Puiseux algebras.- Karaka H.I., Arf Numerical Semigroups With Multiplicity 9 and 10.- Kien Do V. and Matsuoka N., Numerical semigroup rings of maximal embedding dimension with determinantal defining ideals.- Maugeri N. and Zito G., Embedding dimension of a good semigroup.- Moyano-Fernandez J. J., On multi-index filtrations associated to Weierstrass semigroups.- Oneto A. and Tamone G., On the Hilbert function of fourgenerated numerical semigroup rings - ahin M., Lattice Ideals, Semigroups and Toric Codes.- Spirito D., The number of star operations on numerical semigroups and on related integral domains.- Steinburg N. and Wiegand R., Torsion in tensor products over one-dimensional domains.- Strazzanti F. and Watanabe K., Almost Symmetric Numerical Semigroups with Odd Generators.-Tozzo L., Poincaré series on good semigroup ideals.- Watanabe K., A short proof of Bresinskis Theorem on Gorenstein semigroup rings generated by 4 elements
Eigenschaften
Breite: | 162 |
Gewicht: | 728 g |
Höhe: | 237 |
Länge: | 27 |
Seiten: | 374 |
Sprachen: | Englisch |
Autor: | Marco D'Anna, Ralf Fröberg, Scott Chapman, Valentina Barucci |
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