On a geometric comparison of representations of complex and p-adic GLn

Abstract

In this paper, we use geometric methods to study the relations between admissible representations of GLn(C) and unramified representations of GLm(Qp). We show that the geometric relationship between Langlands parameter spaces of GLn(C) and GLm(Qp) constructed by the first named author is compatible with the functor recently defined algebraically by Chan-Wong. We then show that the said relationship intertwines translation functors on representations of GLn(C) and partial Bernstein-Zelevinskii derivatives on representations of GLm(Qp), providing purely geometric counterparts to some results of Chan-Wong. In the sequels, the techniques of this work will be extended to real and p-adic classical groups and used to study their Arthur packets.

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