Bilipschitz equivalence of trees and hyperbolic fillings
From MaRDI portal
Publication:4558899
DOI10.1090/ecgd/322zbMath1402.30023arXiv1702.08762OpenAlexW2964267496MaRDI QIDQ4558899
Publication date: 30 November 2018
Published in: Conformal Geometry and Dynamics of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1702.08762
Quasiconformal mappings in (mathbb{R}^n), other generalizations (30C65) Discrete geometry (52C99) Infinite graphs (05C63)
Cites Work
- Unnamed Item
- Weak capacity and modulus comparability in Ahlfors regular metric spaces
- Elements of asymptotic geometry
- Uniformly continuous maps between ends of \(\mathbb{R}\)-trees
- Homogeneous trees are bilipschitz equivalent
- Amenability, bi-Lipschitz equivalence, and the von Neumann conjecture
- Cheeger isoperimetric constant of Gromov hyperbolic manifolds and graphs
- Cohomologie ℓp espaces de Besov
This page was built for publication: Bilipschitz equivalence of trees and hyperbolic fillings
