Deformations of local systems and Eisenstein series
Abstract
Let X be a (smooth and complete) curve and G a reductive group. In [BG] we introduced the object that we called "geometric Eisenstein series". This is a perverse sheaf EisE (or rather a complex of such) on the moduli stack BunG(X) of principal G-bundles on X, which is attached to a local system E on X with respect to the torus T, Langlands dual to the Cartan subgroup T⊂ G. In loc. cit. we showed thatEisE corresponds to the G-local system induced from E, in the sense of the geometric Langlands correspondence. In the present paper we address the following question, suggested by V. Drinfeld: what is the perverse sheaf on BunG(X) that corresponds to the universal deformation of E as a local system with respect to the Borel subgroup B⊂ G? We prove, following a conjecture of Drinfeld, that the resulting perverse sheaf if the classical, i.e., non-compactified Eisenstein series.
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