Homogeneous quantum symmetries of finite spaces over the circle group

Abstract

Suppose D is a finite dimensional C*-algebra carrying a continuous action of the circle group T. We study the quantum symmetry group of D, taking into account. We show that they are braided compact quantum groups G over T. Here, the R-matrix, Z×Z (m,n) ζ-m· n∈T for a fixed ζ∈ T, governs the braided structure. In particular, if is trivial, ζ=1 or D is commutative, then G coincides with Wang's quantum group of automorphisms of D. Moreover, we show that the bosonisation of G corresponds to the quantum symmetry group of the crossed product C*-algebra D, where the Z-action is generated by ζ-1.