Pages that link to "Item:Q1900019"

The following pages link to Homogeneous trees are bilipschitz equivalent (Q1900019):

Displaying 16 items.

• On the quantitative quasi-isometry problem: transport of Poincaré inequalities and different types of quasi-isometric distortion growth (Q499591) (← links)
• The family of bi-Lipschitz classes of Delone sets in Euclidean space has the cardinality of the continuum (Q741166) (← links)
• Embeddings of hyperbolic groups into products of binary trees (Q948621) (← links)
• A simple proof of a theorem of Whyte. (Q1768260) (← links)
• Amenability, bi-Lipschitz equivalence, and the von Neumann conjecture (Q1974941) (← links)
• Quasi-isometric rigidity for graphs of virtually free groups with two-ended edge groups (Q2065870) (← links)
• Measure-scaling quasi-isometries (Q2133858) (← links)
• Coarse equivalences of Euclidean buildings. (With an appendix by Jeroen Schillewaert and Koen Struyve.) (Q2445964) (← links)
• Burnside's problem, spanning trees and tilings. (Q2636582) (← links)
• Infinite commensurable hyperbolic groups are bi-Lipschitz equivalent (Q2709293) (← links)
• (Q3611514) (← links)
• Bilipschitz equivalence of trees and hyperbolic fillings (Q4558899) (← links)
• (Q4848230) (← links)
• Non-distortion of twin building lattices. (Q5961906) (← links)
• Coarse equivalence versus bijective coarse equivalence of expander graphs (Q6562897) (← links)
• Asymptotic geometry of lamplighters over one-ended groups (Q6614098) (← links)