Archimedean Distinguished Representations and Exceptional Poles
Abstract
Let F be an archimedean local field and let E be F× F (resp. a quadratic extension of F). We prove that an irreducible generic (resp. nearly tempered) representation of GLn(E) is GLn(F) distinguished if and only if its Rankin-Selberg (resp. Asai) L-function has an exceptional pole of level zero at 0. Further, we deduce a necessary condition for the ramification of such representations using the theory of weak test vectors developed by Humphries and Jo.
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