Any flat bundle on a punctured disc has an oper structure

Edward Frenkel; Xinwen Zhu

Journal ArticleOPEN ACCESS

Any flat bundle on a punctured disc has an oper structure

Mathematical Research Letters (2010) 17(1) 27-37

DOI: 10.4310/MRL.2010.v17.n1.a3

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Abstract

We prove that any flat G-bundle, where G is a complex connected reductive algebraic group, on the punctured disc admits the structure of an oper. This result is important in the local geometric Langlands correspondence proposed in [7]. Our proof uses certain deformations of the affine Springer fibers which could be of independent interest. As a byproduct, we construct representations of affine Weyl groups on the homology of these deformations generalizing representations constructed by Lusztig. © International Press 2010.

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Frenkel, E., & Zhu, X. (2010). Any flat bundle on a punctured disc has an oper structure. Mathematical Research Letters, 17(1), 27–37. https://doi.org/10.4310/MRL.2010.v17.n1.a3

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Any flat bundle on a punctured disc has an oper structure

Abstract

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