Noncommutative geometry of the Satake compactification
Nigel Higson (Penn State University)
9:30-10:30, May 18, 2026 , 9:30-10:30, May 19, 2026 , 9:30-10:30, May 20, 2026 , 9:30-10:30, May 21, 2026 Wenfu Building 502
Abstract:
My lectures will be about the construction of a new groupoid in Lie theory,about the noncommutative geometric aspects of this groupoid, and about applications, real and potential, to representation theory. This is joint work with Jacob Bradd and Robert
Yuncken. The (maximal) Satake compactification associated to a real reductive group G is the closure of the symmetric space of all maximal compact subgroups within the compact space of all closed subgroups of G. I shall present different views of a groupoid that may be associated to the Satake compactification. The general idea behind this Satake groupoid is due to Omar Mohsen. But I shall give a Lie-theoretic account of Mohsens construction, and I shall also identify the groupoid with a purely geometric construction arising from Richard Melroses b-calculus. Turning to applications, I shall give a geometric account, using the groupoid, of Harish-Chandras principle that a tempered irreducible representation of a real reductive group is either discrete series, modulo center, or embeddable in a representation that is parabolically induced from such a representation. Time permitting, I shall speculate on potential applications to non-Riemannian symmetric spaces and to Plancherel formulas.
About the speaker:
Nigel Higson ϦѧPenn StateѧϵEvan PughѧڣУѧͷΣоרΪӴۣĹ۽ Baum-Connes —һӴˡμȺʾϵĺѧ
졣Higson Paul Baum ԼƶȽ Alain Connes ͬȷ˸òֽıʽִǽεķչ˵Թס Higson ڵĽܳѧɾΪӮ˹㷺Ĺٻ˹¡оSloan Fellowshipô Aisenstadt¡Coxeter-James ԼѧоѧߵڶȺѡΪôʼѧԺʿ2000꣩ѧѧᣨAMSʿ2012꣩1998ڰֹѧҴICM뱨棬֥ӸѧѧѧȫУҪĹϵн
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