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A minimal set of generators for the canonical ideal of a nondegenerate curve

Wouter Castryck (UGent) and Filip Cools
(2015) JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY. 98(3). p.311-323
Author
Organization
Abstract
We give an explicit way of writing down a minimal set of generators for the canonical ideal of a nondegenerate curve, or of a more general smooth projective curve in a toric surface, in terms of its defining Laurent polynomial.
Keywords
toric surface, SYSTEM, canonical ideal, nondegenerate curve

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MLA
Castryck, Wouter, and Filip Cools. “A Minimal Set of Generators for the Canonical Ideal of a Nondegenerate Curve.” JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY, vol. 98, no. 3, 2015, pp. 311–23, doi:10.1017/S1446788714000573.
APA
Castryck, W., & Cools, F. (2015). A minimal set of generators for the canonical ideal of a nondegenerate curve. JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY, 98(3), 311–323. https://doi.org/10.1017/S1446788714000573
Chicago author-date
Castryck, Wouter, and Filip Cools. 2015. “A Minimal Set of Generators for the Canonical Ideal of a Nondegenerate Curve.” JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY 98 (3): 311–23. https://doi.org/10.1017/S1446788714000573.
Chicago author-date (all authors)
Castryck, Wouter, and Filip Cools. 2015. “A Minimal Set of Generators for the Canonical Ideal of a Nondegenerate Curve.” JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY 98 (3): 311–323. doi:10.1017/S1446788714000573.
Vancouver
1.
Castryck W, Cools F. A minimal set of generators for the canonical ideal of a nondegenerate curve. JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY. 2015;98(3):311–23.
IEEE
[1]
W. Castryck and F. Cools, “A minimal set of generators for the canonical ideal of a nondegenerate curve,” JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY, vol. 98, no. 3, pp. 311–323, 2015.
@article{7025892,
  abstract     = {{We give an explicit way of writing down a minimal set of generators for the canonical ideal of a nondegenerate curve, or of a more general smooth projective curve in a toric surface, in terms of its defining Laurent polynomial.}},
  author       = {{Castryck, Wouter and Cools, Filip}},
  issn         = {{1446-7887}},
  journal      = {{JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY}},
  keywords     = {{toric surface,SYSTEM,canonical ideal,nondegenerate curve}},
  language     = {{eng}},
  number       = {{3}},
  pages        = {{311--323}},
  title        = {{A minimal set of generators for the canonical ideal of a nondegenerate curve}},
  url          = {{http://doi.org/10.1017/S1446788714000573}},
  volume       = {{98}},
  year         = {{2015}},
}
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