Towards the Relative Langlands Duality for Orthosymplectic Pairs

Abstract

In this paper we prove a conjectured equivalence of categories, showing that the S-dual of SO2n× Sp2n acting on C+2n C-2n is equal to SO2n+1× SO2n T*SO2n+1. This result is a particular case of a non-polarized version of the (local) relative Langlands duality of Ben Zvi, Sakellaridis and Venkatesh. Similar results for the pairs (SO2n+1, Sp2n) and (GLn, GLm) were proved by Braverman, Finkelberg, Kazhdan and Travkin and by Fu respectively, whereas the converse result was proved by Braverman, Finkelberg, and Travkin. As a consequence of our main result, we prove that Langlands functoriality of the Derived Satake isomorphism for the pair Sp2n,SO2n is given by the theta correspondence. Our approach works (with appropriate modifications) in the general even orthosymplectic case of osp(2m|2n).