Dorfman connections and Courant algebroids

Abstract

We define Dorfman connections, which are to Courant algebroids what connections are to Lie algebroids. Several examples illustrate this analogy. A linear connection ∇ X(M)×(E)(E) on a vector bundle E over a smooth manifold M is tantamount to a linear splitting TE TqEE H∇, where TqEE is the set of vectors tangent to the fibres of E. Furthermore, the curvature of the connection measures the failure of the horizontal space H∇ to be integrable. We show that linear horizontal complements to TqEE (TqEE) in the Pontryagin bundle over the vector bundle E can be described in the same manner via a certain class of Dorfman connections (TM E*)×(E T*M)(E T*M). Similarly to the tangent bundle case, we find that, after the choice of a linear splitting, the standard Courant algebroid structure of TE T*E E can be completely described by properties of the Dorfman connection. As an application, we study splittings of TA T*A over a Lie algebroid A and, following Gracia-Saz and Mehta, we compute the representations up to homotopy defined by any linear splitting of TA T*A and the linear Lie algebroid TA T*A TM A*. Further, we characterise VB- and LA-Dirac structures in TA T*A via Dorfman connections.