Lie groupoids, the Satake compactification and the tempered dual, I: The Satake groupoid
Abstract
The (maximal) Satake compactification associated to a real reductive group G is the closure of the symmetric space of all maximal compact subgroups of G within the compact space of all closed subgroups of G. We shall present three different views of a groupoid that may be associated to the Satake compactification. To begin, we shall define our Satake groupoid, as we shall call it, as a topological groupoid, and as a special case of a general construction of Omar Mohsen. Then we shall give a Lie-theoretic account of the Satake groupoid, borrowing from work of Toshio Oshima. Finally we shall identify the Satake groupoid with the purely geometric b-groupoid of the Satake compactification, using the structure of the compactification as a smooth manifold with corners. In a subsequent paper we shall use the Satake groupoid to present a new proof of Harish-Chandra's principle, that all the tempered irreducible representations of G may be constructed from discrete series representations using parabolic induction.
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