The Noncommutative Geometry of Tempered Representations

The Connes-Kasparov isomorphism Nigel HIGSON

Course Description
The purpose of these lectures is to study the tempered dual of a real reductive group as a noncommutative topological space. The unitary dual of a locally compact group may be identified with the spectrum of its group C*-algebra. The C*-algebra point of view equips the unitary dual with a topology, and it also associates to every unitary representation of the group, irreducible or not, a closed subset of the dual. In the case of a real reductive group, the tempered dual is the closed set associated to the regular representation. The tempered dual may also be thought of as the spectrum of the so-called reduced C*-algebra. Following standard practice in C*-algebra theory and noncommutative geometry, we shall interpret the problem of studying the tempered dual as a noncommutative topological space as the problem of studying the reduced C*-algebra up to Morita equivalence.

The extra effort that is required to study the tempered dual in this more elaborate way, and not just a set, is rewarded in spectacular fashion by a beautiful isomorphism statement in K-theory that was conjectured by Connes and Kasparov, and later proved by Wassermann and Lafforgue. I shall describe a proof of the Connes-Kasparov isomorphism for real reductive groups that mostly follows the approach outlined by Wassermann but also uses ideas introduced by Vincent Lafforgue, together with new index-theory calculations that extend Lafforgue’s ideas.

講義詳細

年度・期
2017年度・前期集中
開催日
2017年4月14日 から 5月26日
開講部局名
理学研究科
使用言語
英語
教員/講師名
Nigel HIGSON(Distinguished Visiting Professor, Kyoto University / Evan Pugh Professor, Pennsylvania State University)
PAGE TOP