Riesz transforms on compact quantum groups and strong solidity

Martijn Caspers (TU Delft, Netherlands)

07-Dec-2020, 15:00-16:00 (3 years ago)

Abstract: The Riesz transform is one of the most important and classical examples of a Fourier multiplier on the real numbers. It may be described as the operator $\nabla_j \Delta^{-1/2}$ where $\nabla_j = d/dx_j$ is the derivative and $\Delta$ is the Laplace operator. In a more general context the Riesz transform may always be defined for any diffusion semigroup on the reals. In case the generator of this semi-group is the Laplace operator the classical Riesz transform is retrieved. In quantum probability the quantum Markov semi-groups play the role of the diffusion semi-groups and again a suitable notion of Riesz transform can be described.

We show that the Riesz transform may be used to prove rigidity properties of von Neumann algebras. We focus in particular on examples from compact quantum groups. Using these tools we show that a class of quantum groups admits rigidity properties. The class has the following properties:

(1) $\text{SU}_q(2)$ is contained in it.

(2) The class is stable under monoidal equivalence, free products, dual quantum subgroups and wreath products with $S^+_N$.

The rigidity properties include the Akemann-Ostrand property and strong solidity. Part of this talk is based on joint work with Mateusz Wasilewski and Yusuke Isono.

operator algebras

Audience: researchers in the topic


Quantum Groups Seminar [QGS]

Series comments: This seminar aims to bring together experts in the area of quantum groups. The seminar topics will cover the theory of quantum groups and related structures in a large sense: Hopf algebras, operator algebras, q-deformations, higher categories and related branches of noncommutative mathematics.

The zoom link will be distributed by mail, so please join the mailing list if you are interested in attending the seminar.

Organizers: Rubén Martos, Frank Taipe*, Makoto Yamashita
*contact for this listing

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