Holomorphic Rank Two Vector Bundles on Blow-ups

Abstract

In this paper we study holomorphic rank two vector bundles on the blow up of C2 at the origin. A classical theorem of Birchoff and Grothendieck says that any holomorphic vector bundle on the projective plane P1 splits into a sum of line bundles. If E is a holomorphic vector bundle over the blow up of C2 at the origin, then the restriction of E to the exceptional divisor is a vector bundle over P1 and therefore splits. Moreover we assume that E is a rank two bundle that has zero first Chern class. Hence its restriction to the exceptional divisor is of the form O(j) O(-j) for some integer j. We denote by Mj the moduli space of equivalence classes (under holomorphic isomorphisms) of rank two holomorphic vector bundles on the blow up of C2 at the origin whose restriction to the exceptional divisor is O(j) O(-j) .

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