Geometric theta-lifting for the dual pair SO2m, Sp2n
Abstract
Let X be a smooth projective curve over an algebraically closed field of characteristic >2. Consider the dual pair H=SO2m, G=Sp2n over X with H split. Write BunG and BunH for the stacks of G-torsors and H-torsors on X. The theta-kernel on BunG× BunH yields the theta-lifting functors between the derived categories of l-adic sheaves on BunG and BunH. We describe the relation of these functors with Hecke operators. In two particular cases it becomes the geometric Langlands functoriality for this pair (in the nonramified case). Namely, for n=m the functor from the derived category on BunH to that on BunG commutes with Hecke functors with respect to the inclusion of the Langlands dual groups SO2n SO2n+1. For m=n+1 the functor from the derived category on BunG to that on BunH commutes with Hecke functors with respect to the inclusion of the Langlands dual groups SO2n+1 2n+2. In other cases the relation is more complicated and involves the SL2 of Arthur. As a step of the proof, we establish the geometric theta-lifting for the dual pair GLm, GLn. Our global results are derived from the corresponding local ones, which provide a geometric analog of a theorem of Rallis.
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