On generic representations of quasi-split reductive groups over local fields of positive characteristic

Abstract

Let F be a locally compact non-Archimedean field, and G a connected quasi-split reductive group over F. We are interested in complex irreducible smooth generic representations π of G(F). When F has positive characteristic, we prove important properties which previously were only available for F of characteristic 0. The first one is the tempered L-function conjecture of Shahidi, stating that when π as above is tempered, then the L-functions attached to π by the Langlands-Shahidi method have no pole for Re(s)>0. We also establish the standard module conjecture of Casselman and Shahidi, saying that if π is written as the Langlands quotient of a standard module, then it is in fact the full standard module. Finally, for a split classical group G we prove a useful result on the unramified unitary spectrum of G(F).

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