Quantum even spheres Sigmaq2n from Poisson double suspension

Abstract

We define even dimensional quantum spheres Sigmaq2n that generalize to higher dimension the standard quantum two-sphere of Podle's and the four-sphere Sigmaq4 obtained in the quantization of the Hopf bundle. The construction relies on an iterated Poisson double suspension of the standard Podle's two-sphere. The Poisson spheres that we get have the same symplectic foliation consisting of a degenerate point and a symplectic plane and, after quantization, have the same C*-algebraic completion. We investigate their K-homology and K-theory by introducing Fredholm modules and projectors.

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