The 15th HU-SNU Joint Symposium on Mathematics: Operator Algebras

Katsunori Fujie (HU, Ph.D student)

On random interlacing sequences constructed from the eigenvalues of a random matrix and of its minor.

Sang-gyun Youn (SNU professor)

A strong Haagerup inequality for non-Kac free orthogonal quantum groups

Abstract:The Haagerup inequality on the reduced free group C*-algebras has been studied in various contexts, and one surprising fact is that a strengthened form, namely strong Haagerup inequality, can be established for `analytic’ polynomials generated only by the generators g_1,g_2,…,g_n without their inverses. Some natural analogues have been studied in the class of Kac type discrete quantum groups, but not in the non-Kac type situation. The main aim of this talk is to exhibit such a phenomenon for non-Kac free orthogonal quantum group, which is one of the most important quantum group examples.

Keisuke Yoshida (HU posdoc)

Simplicity of the universal C*-algebras associated to multispinal groups

Abstract:In 1984, Grigorchuk found the first example of a group of intermediate growth. His work also provides us an idea on how to construct interesting groups associated to symbolic dynamics. Multispinal groups are defined to give a generalization of the Grigorchuk group. By definition, we have some relations between shift maps and elements in multispinal groups. In my talk, we consider the universal C*-algebras generated by mulitspinal groups and shift maps satisfying the relations. On the hypothesis that multispinal groups are amenable, I give a necessary and sufficient condition for the universal C*-algebras to be simple.

Yusuke Sawada(HU posdoc)

Hypergroups and random walks on graphs

Fatemeh Khosravi (SNU postdoc)

C^*-simplicity and unique trace property for unimodular discrete quantum groups.

Abstract: The action of a discrete group G on its Furstenberg boundary plays an important role in the characterization of simplicity and unique trace property of its reduced C^*-algebra, $C^*_r(G)$. This characterization shows that C*-simplicity forces $C^*_r(G)$ to admit only one tracial state. The generalized notion of the Furstenberg boundary of a discrete group to discrete quantum group is introduced and studied by Kalantar-Kasprzak-Skalski-Vergnioux. In this talk, we discuss the relation of simplicity and uniqueness of the tracial state of the C*-algebra of dual unimodular discrete quantum groups. This is based on an ongoing joint work with Mehrdad Kalantar. 

Yuhei Suzuki (HU)

Simplicity and tracial weights on non-unital reduced crossed products

Seung-Hyeok Kye (Seoul National University)

Convex cones in mapping spaces between matrix algebras