On the existence of twisted Shalika periods: the Archimedean case
Abstract
Let be an archimedean local field. We investigate the existence of the twisted Shalika functionals on irreducible admissible smooth representations of 2n() in terms of their L-parameters. As part of our proof, we establish a Hochschild-Serre spectral sequence for nilpotent normal subgroups and a Kunneth formula in the framework of Schwartz homology. We also prove the analogous result for twisted linear periods using theta correspondence. The existence of twisted Shalika functionals on representations of 2n+() is also studied, which is of independent interest.
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