Universal star products

Abstract

One defines the notion of universal deformation quantization: given any manifold M, any Poisson structure on M and any torsionfree linear connection ∇ on M, a universal deformation quantization associates to this data a star product on (M,) given by a series of bidifferential operators whose corresponding tensors are given by universal polynomial expressions in the Poisson tensor , the curvature tensor R and their covariant iterated derivatives. Such universal deformation quantization exist. We study their unicity at order 3 in the deformation parameter, computing the appropriate universal Poisson cohomology.