Geometric Eisenstein series: twisted setting
Representation Theory
2016-03-22 v4 Algebraic Geometry
Abstract
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.
Cite
@article{arxiv.1409.4071,
title = {Geometric Eisenstein series: twisted setting},
author = {Sergey Lysenko},
journal= {arXiv preprint arXiv:1409.4071},
year = {2016}
}
Comments
69 pages, v4: new results are added