Planar Prop of Differential Operators

Abstract

We propose a definition of differential operators of an associative algebra A in the spirit of Hochschild cohomology. Specifically we define D(A) as the zero cohomology of a certain bicomplex formed by Hom-spaces Hom(A q, A p). We show that it has a structure of a planar prop, i.e. each differential operator has multiple inputs and outputs and they can be composed along planar graphs. Furthermore, for a formally smooth algebra we have the surjective symbol map from D(A) to the space of poly-derivations. We also consider another planar prop E(A) generated by automorphisms of the trivial associative deformation of A over the completion of a free associative algebra. We construct a natural map from E(A) to D(A) and identify its image.