**abstract:**
SubRiemannian manifolds are particular metric spaces which are
generalizations of Riemannian manifolds. Whitney Embedding Theorem
implies that any Riemannian manifold can be biLipschitz embedded into
an Euclidean space. However, this conclusion does not hold anymore if
the manifold is only SubRiemannian. The main purpose of the talk is to
explain that, nevertheless, the analogue of Nash Embedding Theorem is
still valid for subRiemannian manifolds. Time permitting, we will mention some other embedding results, some of which are in collaboration with Urs Lang.

Thu 13 Jan, 14:30 - 15:00, Aula Dini

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