Probabilistic Operator Algebra Seminar: Noncommutative Choquet theory

Seminar | November 25 | 3-5 p.m. | 736 Evans Hall

 Matthew Kennedy, University of Waterloo

 Department of Mathematics

I will present a new framework for noncommutative convexity and noncommutative function theory, along with a corresponding noncommutative Choquet theory that generalizes much of classical Choquet theory. I will also introduce a notion of noncommutative Choquet simplex, which generalizes the classical notion of Choquet simplex and plays a similar role in noncommutative dynamics. I will discuss some applications, including the following extension of Glasner and Weiss's characterization of groups with Kazhdan property (T) : a group has property (T) if and only if whenever it acts on a C*-algebra, the set of invariant states is affinely homeomorphic to the state space of a C*-algebra.

 dvv@math.berkeley.edu