Connections on Lie groupoids and Chern-Weil theory

Abstract

Let X=[X1 X0] be a Lie groupoid equipped with a connection, given by a smooth distribution H ⊂ T X1 transversal to the fibers of the source map. Under the assumption that the distribution His integrable, we define a version of de Rham cohomology for the pair (X, H), and we study connections on principal G-bundles over (X, H) in terms of the associated Atiyah sequence of vector bundles. We also discuss associated constructions for differentiable stacks. Finally, we develop the corresponding Chern-Weil theory and describe characteristic classes of principal G-bundles over a pair (X, H).