Andrei Tyurin
Published 1999-04-11Version 1
Geometric Quantization links holomorphic geometry with real geometry, a relation that is a prototype for the modern development of mirror symmetry. We show how to use this treatment to construct a special basis in every space of conformal blocks. This is a direct generalization of the basis of theta functions with characteristics in every complete linear system on an Abelian variety (see Mumford's "Tata lectures on theta" cite(Mumford)). The same construction generalizes the classical theory of theta functions to vector bundles of higher rank on Abelian varieties and K3 surfaces. We also discuss the geometry behind these constructions.
Comments: 33 pp., to appear as Jussieu Math Preprint
The groups of points on abelian varieties over finite fields
Isogeny classes of abelian varieties with no principal polarizations
Some elementary theorems about divisibility of 0-cycles on abelian varieties defined over finite fields
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