Deforming monomial space curves into set-theoretic complete intersection singularities
Michel Granger and Mathias Schulze
Journal of Singularities
volume 17 (2018), 413-427
Received: 2 May 2018. Received in revised form: 17 December 2018
Add a reference to this article to your citeulike library.
Abstract:
We deform monomial space curves in order to construct examples of set-theoretical complete intersection space curve singularities. As a by-product we describe an inverse to Herzog's construction of minimal generators of non-complete intersection numerical semigroups with three generators.
Keywords:
Set-theoretic complete intersection, space curve, singularity, deformation, lattice ideal, determinantal variety
Mathematical Subject Classification (2010):
Primary 32S30; Secondary 14H50, 20M25
Author(s) information:
| Michel Granger | Mathias Schulze |
| Département de Mathématiques | Department of Mathematics |
| LAREMA, CNRS UMR | TU Kaiserslautern |
| Université d'Angers | 67663 Kaiserslautern, Germany |
| 49045 Angers, France | |
| email: granger@univ-angers.fr | email: mschulze@mathematik.uni-kl.de |
Copyright © 2018 Worldwide Center of Mathematics LLC, All Rights Reserved ®