On 2d TQFTs whose values are holomorphic symplectic varieties
Abstract
For simple and simply-connected complex algebraic group G, we conjecture the existence of a functor etaG from the category of 2-bordisms to the category of holomorphic symplectic varieties with Hamiltonian action, such that gluing of boundaries corresponds to the holomorphic symplectic quotient with respect to the diagonal action of G. We describe various properties of etaG obtained via string-theoretic analysis. Mathematicians are urged to construct etaG rigorously.
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