Abstract
In this paper we obtain bounds on $h^0(E)$ where $E$ is a semistable bundle of rank 3 over a smooth irreducible projective curve $X$ of genus $g \geq 2$ defined over an algebraically closed field of characteristic 0. These bounds are expressed in terms of the degrees of stability $s_1(E)$, $s_2(E)$. We show also that in some cases the bounds are best possible. These results extend recent work of J. Cilleruelo and I. Sols for bundles of rank 2.
Citation
Herbert Lange . Peter E. Newstead . "On Clifford's theorem for rank-3 bundles." Rev. Mat. Iberoamericana 22 (1) 287 - 304, May, 2006.
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