![Algebraic geometry / Vector bundles / Projective variety / Ample line bundle / Stable vector bundle / Smooth scheme / Torsion tensor / Tangent bundle / Moduli space / Projective bundle / Coherent sheaf cohomology Algebraic geometry / Vector bundles / Projective variety / Ample line bundle / Stable vector bundle / Smooth scheme / Torsion tensor / Tangent bundle / Moduli space / Projective bundle / Coherent sheaf cohomology](https://www.pdfsearch.io/img/a217bfd322b644ef0698bc6dd86dd440.jpg) Date: 2010-07-27 07:24:35Algebraic geometry Vector bundles Projective variety Ample line bundle Stable vector bundle Smooth scheme Torsion tensor Tangent bundle Moduli space Projective bundle Coherent sheaf cohomology | | Problems for Hausel’s Lectures 1. Assume E and F are stable bundles on a smooth projective curve C of the same slope. (a) Show that if f : E → F is a non-zero homomorphism then it is an isomorphism. (b) Deduce that aAdd to Reading ListSource URL: m2.geometry.deDownload Document from Source Website File Size: 15,94 KBShare Document on Facebook
|