On certain invariants of compact quantum groups

Abstract: We introduce and study a number of invariants of locally compact quantum groups defined by their scaling and modular groups and the spectrum of their modular elements. Focusing mainly on compact quantum groups we consider the question whether triviality of one of the invariants is equivalent to the quantum group being of Kac type and show that it has a positive answer in many cases including duals of second countable type $\mathrm{I}$ discrete quantum groups. We perform a complete calculation of the invariants for all $q$-deformations of compact, simply connected, semisimple Lie groups as well as for some non-compact quantum groups and the compact quantum groups $\operatorname{U}_F^+$. Finally we introduce a family of conditions for discrete quantum groups which for classical discrete groups are all equivalent to the fact that the group is i.c.c. We show that the above mentioned question about characterization of Kac type quantum groups by one of our invariants has a positive answer for duals of discrete quantum groups satisfying such an i.c.c.-type condition and illustrate this with the example of $\operatorname{U}_F^+$.