Higher Covariant Derivative and the Bundle of Dirac Currents

Abstract

Using the higher covariant derivative on a manifold M equipped with a torsion-free connection, we define a natural surjective bundle map Φ from ((TM)) ((TM)) to the vector bundle U(M) of de Rham currents on M supported in a single (variable) point. The resulting quotient bundle can be thought of as a bundle of generalized Weyl algebras, with the symplectic form replaced with the Riemannian curvature tensor. The fibers of the bundle U(M) are differential co-algebras, and the boundary, co-product and co-unit stitch together to form bundle maps which lift via Φ to commuting bundle maps on ((TM)) ((TM)) . Interior product, higher-order covariant differentiation, and their L2 adjoints also form bundle maps on U(M) which lift via Φ. The higher-order covariant derivative in particular is an R -algebra representation of the space C∞((TM)) equipped with a non-standard, covariant product. Its composition with interior product yields a quantization of U(M) corresponding to a Hopf-algebraic smash product. Finitely supported and locally finitely supported sections functors can be applied to U(M) , yielding the spaces of finitely supported and locally finitely supported currents, respectively. In particular, the finitely supported currents on a smooth manifold are a filtered differential graded co-algebra in duality with differential forms.