The tangent groupoid of a Heisenberg manifold
Abstract
As a step toward proving an index theorem for hypoelliptic operators Heisenberg manifolds, including those on CR and contact manifolds, we construct an analogue for Heisenberg manifolds of Connes' tangent groupoid of a manifold M. As it is well known for a Heisenberg manifold (M,H) the relevant notion of tangent is rather that of Lie group bundle of graded 2-step nilpotent Lie groups GM. We then construct the tangent groupoid of (M,H) as a differentiable groupoid H M encoding the smooth deformation of M× M to GM. In this construction a crucial use is made of a refined notion of privileged coordinates and of a tangent approximation result for Heisenberg diffeomorphisms.
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