Noncommutative Spheres and Instantons

We report on some recent work on deformation of spaces, notably deformation of spheres, describing two classes of examples. The first class of examples consists of noncommutative manifolds associated with the so called θ-deformations which were introduced in [17] out of a simple analysis in terms of cycles in the (b,B)-complex of cyclic homology. These examples have non-trivial global features and can be endowed with a structure of noncommutative manifolds, in terms of a spectral triple (A,H,D). In particular, noncommutative spheres SN θ are isospectral deformations of usual spherical geometries. For the corresponding spectral triple (C∞(SN θ ),H,D), both the Hilbert space of spinors H = L2(SN ,S) and the Dirac operator D are the usual ones on the commutative N -dimensional sphere SN and only the algebra and its action on H are deformed. The second class of examples is made of the so called quantum spheres SN q which are homogeneous spaces of quantum orthogonal and quantum unitary groups. For these spheres, there is a complete description of K-theory, in terms of nontrivial selfadjoint idempotents (projections) and unitaries, and of the K-homology, in term of nontrivial Fredholm modules, as well as of the corresponding Chern characters in cyclic homology and cohomology. These notes are based on invited lectures given at the International Workshop on Quantum Field Theory and Noncommutative Geometry, November 26-3