Carnot rectifiability of sub-Riemannian manifolds with constant tangent
Abstract
We show that if M is a sub-Riemannian manifold and N is a Carnot group such that the nilpotentization of M at almost every point is isomorphic to N, then there are subsets of N of positive measure that embed into M by bilipschitz maps. Furthermore, M is countably N--rectifiable, i.e., all of M except for a null set can be covered by countably many such maps.
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