A generalized semi-infinite Hecke equivalence and the local geometric Langlands correspondence

Abstract

We introduce a class of equivalences, which we call generalized semi-infinite Hecke equivalences, between certain categories of representations of graded associative algebras which appear in the setting of semi-infinite cohomology for associative algebras and categories of representations of related algebras of Hecke type which we call semi-infinite Hecke algebras. As an application we obtain an equivalence between a category of representations of a non-twisted affine Lie algebra g of level -2h-k, where h is the dual Coxeter number of the underlying semisimple Lie algebra g and k∈ C, and the category of finitely generated representations of the W-algebra associated to g of level k. When k=-h this yields an equivalence between a category of representations of g of central charge -h and the category Coh( OpLG(D×)) of coherent sheaves on the space OpLG(D×) of LG-opers on the punctured disc D×, where LG is the Langlands dual group to the algebraic group of adjoint type with Lie algebra g. This can be regarded as a version of the local geometric Langlands correspondence. The above mentioned equivalences generalize to the case of affine Lie algebras the Skryabin equivalence between the categories of generalized Gelfand-Graev representations of g and the categories of representations of the corresponding finitely generated W-algebras, and Kostant's results on the classification of Whittaker modules over g.