On Frobenius-destabilized rank-2 vector bundles over curves
Abstract
Let X be a smooth projective curve of genus g ≥ 2 over an algebraically closed field k of characteristic p > 0. Let MX be the moduli space of semistable rank-2 vector bundles over X with trivial determinant. The relative Frobenius map F: X X1 induces by pull-back a rational map V: MX1 MX. In this paper we show the following results. 1) For any line bundle L over X, the rank-p vector bundle F*L is stable. 2) The rational map V has base points, i.e., there exist stable bundles E over X1 such that F* E is not semistable. 3) Let B ⊂ MX1 denote the scheme-theoretical base locus of V. If g=2, p>2 and X ordinary, then B is a 0-dimensional local complete intersection of length 2/3p(p2 -1) and the degree of V equals 1/3p(p2 +2).
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