Open AccessGeometric Eisenstein series: twisted setting
Author(s) -
Sergey Lysenko
Publication year - 2017
Publication title -
journal of the european mathematical society
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 3.549
H-Index - 64
eISSN - 1435-9863
pISSN - 1435-9855
DOI - 10.4171/jems/738
Subject(s) - mathematics , eisenstein series , compactification (mathematics) , pure mathematics , sheaf , stack (abstract data type) , langlands program , series (stratigraphy) , algebraically closed field , cohomology , moduli , algebra over a field , automorphic form , modular form , biology , physics , quantum mechanics , computer science , programming language , paleontology
Let G be a simple simply-connected group over an algebraically closed field k, X be a smooth connected projective curve over k. In this paper we develop the theory of geometric Eisenstein series on the moduli stack Bun_G of G-torsors on X in the setting of the quantum geometric Langlands program (for \'etale l-adic sheaves) in analogy with [3]. We calculate the intersection cohomology sheaf on the version of Drinfeld compactification in our twisted setting. In the case G=SL_2 we derive some results about the Fourier coefficients of our Eisenstein series. In the case of G=SL_2 and X=P^1 we also construct the corresponding theta-sheaves and prove their Hecke property.
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