Relative Langlands duality and Koszul duality
Abstract
Consider a pair of S-dual hyperspherical varieties G X and G X equipped with equivariant quantizations Q(X), Q(X). Assume that the local conjecture of Ben-Zvi, Sakellaridis and Venkatesh holds for this pair, and also that X T*ψ(Y) is polarized, so that Q(X)=Dψ(Y). Let B⊂ G (resp. B⊂ G) be Borel subgroups. Then using a variant of the S1-equivariant localization of arxiv:0706.0322, we deduce an equivalence between the Z/2-graded B-equivariant category (Dψ(Y)-modB) Z/2 and the Z/2-graded unipotent B-monodromic category (Q(X)-modB,mon) Z/2.
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