Conformally invariant quantization -- towards complete classification

Abstract

Let M be a smooth manifold equipped with a conformal structure, E[w] the space of densities with the the conformal weight w and Dw,w+ the space of differential operators from E[w] to E[w+δ]. Conformal quantization Q is a right inverse of the principle symbol map on Dw,w+δ such that Q is conformally invariant and exists for all w. This is known to exists for generic values of δ. We give explicit formulae for Q for all δ out of the set of critical weights. We provide a simple description of this set and conjecture its minimality.