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arxiv: 2108.07745 · v1 · pith:ZY3AURSTnew · submitted 2021-08-17 · 🧮 math.AG

Connections on moduli spaces and infinitesimal Hecke modifications

classification 🧮 math.AG
keywords modulicategoryconformald-modulesderivedflatg-bundleshecke
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Let X be a proper scheme and Z a prestack over X equipped with a flat connection. We give a local-to-global description of D-modules on the prestack S(Z) of flat sections of Z. Examples of S(Z) include the moduli stacks of principal G-bundles and de Rham local systems on X. We show that the category of D-modules is equivalent to the category of ind-coherent sheaves which are equivariant with respect to infinitesimal Hecke groupoids parametrized by finite subsets of X. We describe a number of applications to geometric representation theory and conformal field theory, including a derived enhancement of the Verlinde formula: the derived space of conformal blocks (a.k.a. chiral homology) of the WZW model is isomorphic to the cohomology of the corresponding line bundle on Bun_G, the moduli stack of G-bundles.

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    Proves Toda's chi-independence conjecture and identifies BPS Lie algebra with tautological classes for one-dimensional Mukai vectors using Hecke operators and bialgebra structures.