English

The free unitary compact quantum group

Quantum Algebra 2017-11-23 v6

Abstract

The free analogues of U(n)U(n) in Woronowicz's compact quantum group theory are the quantum groups {Au(F)FGL(n,C)}\{A_u(F)|F\in GL(n,\mathbb C)\} introduced by Van Daele and Wang. We classify here their irreducible representations. Their fusion rules turn to be related to the combinatorics of Voiculescu's circular variable. If FFˉRInF\bar{F}\in\mathbb R I_n we find an embedding Au(F)redC(T)redAo(F)A_u(F)_{red}\subset C(\mathbb T)*_{red}A_o(F), where Ao(F)A_o(F) is the deformation of SU(2)SU(2) that we previously studied. We use the representation theory and Powers' method for showing that the reduced algebras Au(F)redA_u(F)_{red} are simple, with at most one trace.

Keywords

Cite

@article{arxiv.math/9901042,
  title  = {The free unitary compact quantum group},
  author = {Teodor Banica},
  journal= {arXiv preprint arXiv:math/9901042},
  year   = {2017}
}

Comments

30 pages