Courant Algebroids in Parabolic Geometry

Abstract

Let p be a Lie subalgebra of a semisimple Lie algebra g and (G,P) be the corresponding pair of connected Lie groups. A Cartan geometry of type (G,P) associates to a smooth manifold M a principal P-bundle and a Cartan connection, and a parabolic geometry is a Cartan geometry where P is parabolic. We show that if P is parabolic, the adjoint tractor bundle of a Cartan geometry, which is isomorphic to the Atiyah algebroid of the principal P-bundle, admits the structure of a (pre-)Courant algebroid, and we identify the topological obstruction to the bracket being a Courant bracket. For semisimple G, the Atiyah algebroid of the principal P-bundle associated to the Cartan geometry of (G,P) admits a pre-Courant algebroid structure if and only if P is parabolic.