On characteristic classes of vector bundles over quantum spheres

Abstract

We study the quantization of spaces whose K-theory in the classical limit is the ring of dual numbers Z[t]/(t2). For a compact Hausdorff space we recall necessary and sufficient conditions for this to hold. For a compact quantum space, we give sufficient conditions that guarantee there is a morphism of abelian groups K0 Z[t]/(t2) compatible with the tensor product of bimodules. Applications include the standard Podle\'s sphere S2q and a quantum 4-sphere S4q coming from quantum symplectic groups. For the latter, the K-theory is generated by the Euler class of the instanton bundle. We give explicit formulas for the projections of vector bundles on S4q associated to the principal SUq(2)-bundle S7q S4q via irreducible corepresentations of SUq(2), and compute their characteristic classes.