On some algebraic and geometric aspects of the quantum unitary group
Abstract
Consider the compact quantum group Uq(2), where q is a non-zero complex deformation parameter such that |q|≠ 1. Let C(Uq(2)) denote the underlying C*-algebra of the compact quantum group Uq(2). We prove that if q is a non-real complex number and q is real, then the underlying C*-algebras C(Uq(2)) and C(Uq(2)) are non-isomorphic. This is in sharp contrast with the case of braided SUq(2), introduced earlier by Woronowicz et al., where q is a non-zero complex deformation parameter. In another direction, on a geometric aspect of Uq(2), we introduce torus action on the C*-algebra C(Uq(2)) and obtain a C*-dynamical system (C(Uq(2)),T3,α). We construct a T3-equivariant spectral triple for Uq(2) that is even and 3+-summable. It is shown that the Dirac operator is K-homologically nontrivial.
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