His speciality is the study of quantum groups.

His most recent contributions have been to the theory of quantum groups, a branch of theoretical physics.

These Hopf algebras are often called quantum groups, a term that is so far only loosely defined.

His research is in the fields of low-dimensional topology, representation theory, and quantum groups.

Moreover, these coherent states may be generalized to quantum groups.

He is also known for contributions to quantum groups.

The main motivation of these works was to give another look on quantum groups.

Continuous techniques were applied to many aspects of group theory using function spaces and quantum groups.

In general, a quantum group is some kind of Hopf algebra.

The center of quantum group can be described by quantum determinant.