1. Linear syzygies of curves with prescribed gonality.
- Author
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Farkas, Gavril and Kemeny, Michael
- Subjects
- *
LINEAR orderings , *CURVES , *LOGICAL prediction - Abstract
We prove two statements concerning the linear strand of the minimal free resolution of a k -gonal curve C of genus g. Firstly, we show that a general curve C of genus g of non-maximal gonality k ≤ g + 1 2 satisfies Schreyer's Conjecture, that is, b g − k , 1 (C , ω C) = g − k. This statement goes beyond Green's Conjecture and predicts that all highest order linear syzygies in the canonical embedding of C are determined by the syzygies of the (k − 1) -dimensional scroll containing C. Secondly, we prove an optimal effective version of the Gonality Conjecture for general k -gonal curves, which makes more precise the (asymptotic) Gonality Conjecture proved by Ein–Lazarsfeld and improves results of Rathmann. [ABSTRACT FROM AUTHOR]
- Published
- 2019
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