Linear coactions of discrete quantum groups on the circle

Abstract

For a (unital) C*-algebra , we construct a C*-algebraic discrete quantum group (DQG) aut(), coacting on , which is a quantum generalization of Aut() in the framework of discrete quantum groups, in the sense that any other coaction of a DQG on factors through the above coaction of aut(). We prove by an explicit calculation that if any Kac-type C*-algebraic discrete quantum group Q has a `weakly faithful' coaction on C(S1) which is `linear' in the sense that it leaves the space spanned by \ Z, Z \ invariant, then Q must be classical, i.e. isomorphic with C0() for some discrete group . This parallels the well-known result of non-existence of genuine compact quantum group symmetry obtained by the first author and his collaborators ([GB16] and the references therein).