Sharp geometric rigidity of isometries on Heisenberg group
Abstract
We prove quantitative stability of isometries on the first Heisenberg group with sub-Riemannian geometry: every (1+ )-quasi-isometry of the John domain of the Heisenberg group H is close to some isometry with order of closeness + in the uniform norm and with order of closeness in the Sobolev norm L21. Homogeneous dilations show the asymptotic sharpness of the results.
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