Cohomology of Courant algebroids with split base

Abstract

We study the (standard) cohomology Hst(E) of a Courant algebroid E. We prove that if E is transitive, the standard cohomology coincides with the naive cohomology Hnaive(E) as conjectured by Stienon and Xu. For a general Courant algebroid we define a spectral sequence converging to its standard cohomology. If E is with split base, we prove that there exists a natural transgression homomorphism T3 (with image in H3naive(E)) which, together with the naive cohomology, gives all Hst(E). For generalized exact Courant algebroids, we give an explicit formula for T3 depending only on the Severa characteristic clas of E.