English

Coarse differentiation and quantitative nonembeddability for Carnot groups

Metric Geometry 2013-06-19 v3 Group Theory

Abstract

We give lower bound estimates for the macroscopic scale of coarse differentiability of Lipschitz maps from a Carnot group with the Carnot-Carath\'{e}odory metric (G,\dcc)(G,\dcc) to a few different classes of metric spaces. Using this result, we derive lower bound estimates for quantitative nonembeddability of Lipschitz embeddings of GG into a metric space (X,dX)(X,d_X) if XX is either an Alexandrov space with nonpositive or nonnegative curvature, a superreflexive Banach space, or another Carnot group that does not admit a biLipschitz homomorphic embedding of GG. For the same targets, we can further give lower bound estimates for the biLipschitz distortion of every embedding f:B(n)Xf : B(n) \to X, where B(n) is the ball of radius nn of a finitely generated nonabelian torsion-free nilpotent group GG. We also prove an analogue of Bourgain's discretization theorem for Carnot groups and show that Carnot groups have nontrivial Markov convexity. These give the first examples of metric spaces that have nontrivial Markov convexity but cannot biLipschitzly embed into Banach spaces of nontrivial Markov convexity.

Keywords

Cite

@article{arxiv.1304.6633,
  title  = {Coarse differentiation and quantitative nonembeddability for Carnot groups},
  author = {Sean Li},
  journal= {arXiv preprint arXiv:1304.6633},
  year   = {2013}
}

Comments

60 pages. Fixed some small errors and improved the readability in some parts

R2 v1 2026-06-22T00:05:38.515Z