Mathematics – Algebraic Geometry
Scientific paper
2009-12-18
Mathematics
Algebraic Geometry
Scientific paper
Let X be a smooth projective curve of genus g >1 defined over an algebraically closed field k of characteristic p >0. For p sufficiently large (explicitly given in terms of r,g) we construct an atlas for the locus of all Frobenius-destabilized bundles (i.e. we construct all Frobenius-destabilized bundles of degree zero up to isomorphism). This is done by exhibiting a surjective morphism from a certain Quot-scheme onto the locus of stable Frobenius-destabilized bundles. Further we show that there is a bijective correspondence between the set of stable vector bundles E over X such that the pull-back F^*(E) under the Frobenius morphism of X has maximal Harder-Narasimhan polygon and the set of opers having zero p-curvature. We also show that, after fixing the determinant, these sets are finite, which enables us to derive the dimension of certain Quot-schemes and certain loci of stable Frobenius-destabilized vector bundles over X. The finiteness is proved by studying the properties of the Hitchin-Mochizuki morphism. In particular we prove a generalization of a result of Mochizuki to higher ranks.
Joshi Kirti
Pauly Christian
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