Alejandro Cabrera, Thiago Drummond
Published 2016-02-22Version 1
VB-groupoids define a special class of Lie groupoids which carry a compatible linear structure. In this paper, we show that their differentiable cohomology admits a refinement by considering the complex of cochains which are k-homogeneous on the linear fiber. Our main result is a Van Est theorem for such cochains. We also work out two applications to the general theory of representations of Lie groupoids and algebroids. The case k=1 yields a Van Est map for representations up to homotopy on 2-term graded vector bundles. Arbitrary k-homogeneous cochains on suitable VB-groupoids lead to a novel Van Est theorem for differential forms on Lie groupoids with values in a representation.
Affine connections on the algebra of differential forms
A family of Riesz distributions for differential forms on Euclidian space
Note on explicit proof of Poincare inequality for differential forms on manifolds
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