Litcius/Paper detail

Trees of manifolds as boundaries of spaces and groups

Jacek Świątkowski

2020Geometry & Topology10 citationsDOIOpen Access PDF

Abstract

We show that trees of manifolds, the topological spaces introduced by Jakobsche, appear as boundaries at infinity of various spaces and groups. In particular, they appear as Gromov boundaries of some hyperbolic groups, of arbitrary dimension, obtained by the procedure of strict hyperbolization. We also recognize these spaces as boundaries of arbitrary Coxeter groups with manifold nerves and as Gromov boundaries of the fundamental groups of singular spaces obtained from some finite-volume hyperbolic manifolds by cutting off their cusps and collapsing the resulting boundary tori to points.

Topics & Concepts

MathematicsBoundary (topology)Pure mathematicsCoxeter groupManifold (fluid mechanics)Hyperbolic groupRelatively hyperbolic groupHyperbolic manifold3-manifoldInfinityTorusHyperbolic 3-manifoldHyperbolic treeFundamental groupGroup (periodic table)Stable manifoldHyperbolic spaceMathematical analysisComplex manifoldCovering spaceHyperbolic triangleTopological spaceTopology (electrical circuits)Space (punctuation)Simply connected spaceGeometric and Algebraic TopologyAdvanced Combinatorial MathematicsHomotopy and Cohomology in Algebraic Topology