Moduli space of G-connections on an elliptic curve
Abstract
Let X be a smooth complex elliptic curve and G a connected reductive affine algebraic group defined over C. Let MX(G) denote the moduli space of topologically trivial algebraic G--connections on X, that is, pairs of the form (EG\, , D), where EG is a topologically trivial algebraic principal G--bundle on X, and D is an algebraic connection on EG. We prove that MX(G) does not admit any nonconstant algebraic function while being biholomorphic to an affine variety.
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