I. Grzegorczyk, V. Mercat, P. E. Newstead
Published 2010-06-07, updated 2011-03-23Version 3
This paper contains results on stable bundles of rank 2 with space of sections of dimension 4 on a smooth irreducible projective algebraic curve $C$. There is a known lower bound on the degree for the existence of such bundles; the main result of the paper is a geometric criterion for this bound to be attained. For a general curve $C$ of genus 10, we show that the bound cannot be attained, but that there exist Petri curves of this genus for which the bound is sharp. We interpret the main results for various curves and in terms of Clifford indices and coherent systems.
Comments: Correction of typos; introduction partially rewritten; postscript and new references added
Journal: Internat. J. Math. 22, no.12 (2011), 1743-1762
(0,2)-Deformations and the $G$-Hilbert Scheme
New lower bounds for matrix multiplication and the 3x3 determinant
A lower bound for $χ(\mathcal O_S)$
![QR code for arXiv:1006.1258 [math.AG]](http://oss.arxitics.com/images/favicon.svg)