Automorphic L-functions, intertwining operators, and the irreducible tempered representations of p-adic groups
Abstract
We give an expository account of the theory of intertwining operators for connected reductive p--adic groups, and their connection with automorphic L--functions. Our purpose is to illustrate the relation between harmonic analysis and arithmetic. In particular, we describe how the theory of Plancherel measures allows us to compute certain local Langlands L--functions. In order to be more self contained, we give a brief introduction to the Langlands program. The theory of R--groups and elliptic representations is treated here as well. Finally, we give an example which illustrates how the theory of twisted endoscopy plays a crucial role in determining the poles of both the intertwining operators and the local Langlands L--functions in question. A version of this manuscript, in revised form, will appear as a chapter in the proceedings of the conference ``Teoria de Representaciones de Groupos Algebraicos Sobre Cuerpos Locales y Applicationes'' (C. Bushnell, P. Kutzko, J. Pantoja, J. Soto Andrade eds.).
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