Mathematics – Quantum Algebra
Scientific paper
2006-11-09
Mathematics
Quantum Algebra
Latex, 73 pp., to appear in Proceedings of the CIME Summer School "Representation Theory and Complex Analysis", Venice, June 2
Scientific paper
The global geometric Langlands correspondence relates Hecke eigensheaves on the moduli stack of G-bundles on a smooth projective algebraic curve X and holomorphic G'-bundles with connection on X, where G' is the Langlands dual group of G. This correspondence is relatively well understood when the connection has no singularities, i.e., is unramified. But what should happen if the connection has singularities, or ramification, at finitely many points of X? In this case we expect to attach to it a category of Hecke eigensheaves on a suitable moduli stack of G-bundles on X with parabolic (or level) structures at the ramification points. In this paper I review an approach to constructing these categories developed by D.Gaitsgory and myself. It uses representations of affine Kac-Moody algebras of critical level and localization functors from these representations to D-modules on the moduli spaces of bundles with parabolic (or level) structures. As explained in hep-th/0512172, these D-modules may be viewed as sheaves of conformal blocks naturally arising in the framework of Conformal Field Theory.
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