Projective structures on Riemann surface and natural differential operators
Abstract
We investigate the holomorphic differential operators on a Riemann surface M. This is done by endowing M with a projective structure. Let L be a theta characteristic on M. We explicitly describe the jet bundle Jk(E L n), where E is a holomorphic vector bundle on M equipped with a holomorphic connection, for all k and n. This provides a description of holomorphic differential operators from E L n to another holomorphic vector bundle F using the natural isomorphism Diffk(E L n, F)= F (Jk(E L n))*.
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