Relating Arthur packets of real unitary groups and p-adic symplectic and orthogonal groups
Abstract
We establish an explicit correspondence of certain Arthur packets between real unitary groups and p-adic symplectic or orthogonal groups. This allows one to compute Arthur packets of real unitary groups by translating results from the p-adic side. A main ingredient in our proof is an explicit relation between Zuckerman's translation functor on the real side and the Jacquet functor on the p-adic side. To achieve this, we construct a correspondence of stacks of Langlands parameters with fixed infinitesimal characters between the relevant real and p-adic groups. Our approach also allows one to relate the Kazhdan-Lusztig polynomials and the microlocal geometry between real and p-adic sides.
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