Quasi-isometric rigidity of piecewise geometric manifolds

Abstract: Two groups are virtually isomorphic if they can be obtained one from the other via a finite number of steps, where each step consists in taking a finite extension or a finite index subgroup (or viceversa). Virtually isomorphic groups are always quasi-isometric, and a group Γ is quasi-isometrically rigid if every group quasi-isometric to Γ is virtually isomorphic to Γ. In this survey we describe quasi-isometric rigidity results for fundamental groups of manifolds which can be decomposed into geometric pieces. A… Show more

“…Many of the ideas of this paper can be tracked back to these two works. We refer the reader to [Fri16] for a survey on quasi-isometric rigidity for fundamental groups of manifolds that decompose in geometric pieces.…”

Quasi-Isometric Rigidity of Cusp-Decomposable Manifolds

“…Many of the ideas of this paper can be tracked back to these two works. We refer the reader to [Fri16] for a survey on quasi-isometric rigidity for fundamental groups of manifolds that decompose in geometric pieces.…”

Quasi-Isometric Rigidity of Cusp-Decomposable Manifolds