A combinatorial interpretation for Schreyer's tetragonal invariants

Wouter Castryck, Filip Cools

Type: Article

Publication Date: 2015-01-01

Citations: 5

DOI: https://doi.org/10.4171/dm/509

Abstract

Schreyer has proved that the graded Betti numbers of a canonical tetragonal curve are determined by two integers b_1 and b_2 , associated to the curve through a certain geometric construction. In this article we prove that in the case of a smooth projective tetragonal curve on a toric surface, these integers have easy interpretations in terms of the Newton polygon of its defining Laurent polynomial. We can use this to prove an intrinsicness result on Newton polygons of small lattice width.

Locations

Documenta Mathematica - View - PDF
arXiv (Cornell University) - View - PDF
Ghent University Academic Bibliography (Ghent University) - View - PDF
Open University of Cape Town (University of Cape Town) - View - PDF

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Works Cited by This (13)

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+	The number of moduli of families of curves on toric surfaces	1991	R.J. Koelman
+ PDF Chat	Lattice Polygons and the Number 2<i>i</i> + 7	2009	Christian Haase Josef Schicho
+	Polytopal Linear Groups	1999	Winfried Bruns Joseph Gubeladze
+	On Petri's analysis of the linear system of quadrics through a canonical curve	1973	B. Saint-Donat
+	Newton polyhedra and toroidal varieties	1978	Askold Khovanskiĭ
+ PDF Chat	Lifting of morphisms to quotient presentations	2003	Florian Berchtold
+	A criterion for the ideal of a projectively embedded toric surface to be generated by quadrics.	1993	Robert Jan Koelman
+	Syzygies of canonical curves and special linear series	1986	Frank–Olaf Schreyer
+ PDF Chat	On nondegeneracy of curves	2009	Wouter Castryck John Voight
+	The lattice size of a lattice polygon	2015	Wouter Castryck Filip Cools