Raynaud vector bundles
Abstract
We construct vector bundles Rrμ on a smooth projective curve X having the property that for all sheaves E of slope μ and rank r on X we have an equivalence: E is a semistable vector bundle Hom(Rrμ,E)=0. As a byproduct of our construction we obtain effective bounds on r such that the linear system |R · | has base points on the moduli space UX(r,r(g-1)).
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