Courant-Dorfman algebras and their cohomology

Abstract

We introduce a new type of algebra, the Courant-Dorfman algebra. These are to Courant algebroids what Lie-Rinehart algebras are to Lie algebroids, or Poisson algebras to Poisson manifolds. We work with arbitrary rings and modules, without any regularity, finiteness or non-degeneracy assumptions. To each Courant-Dorfman algebra (,) we associate a differential graded algebra (,) in a functorial way by means of explicit formulas. We describe two canonical filtrations on (,), and derive an analogue of the Cartan relations for derivations of (,); we classify central extensions of in terms of H2(,) and study the canonical cocycle ∈3(,) whose class [] obstructs re-scalings of the Courant-Dorfman structure. In the nondegenerate case, we also explicitly describe the Poisson bracket on (,); for Courant-Dorfman algebras associated to Courant algebroids over finite-dimensional smooth manifolds, we prove that the Poisson dg algebra (,) is isomorphic to the one constructed in Roy4-GrSymp using graded manifolds.