On \(3\)-dimensional WGSC inverse-representations of groups
From MaRDI portal
Publication:1701417
DOI10.1007/s10474-017-0698-2zbMath1399.57001OpenAlexW2589271293MaRDI QIDQ1701417
Corrado Tanasi, Francesco G. Russo, Daniele Ettore Otera
Publication date: 22 February 2018
Published in: Acta Mathematica Hungarica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10474-017-0698-2
singularityfinitely presented groupquasi-simple filtrationsimple connectivity at infinity\(3\)-manifoldweak geometric simple connectivity
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- An application of Poénaru's ``zipping theory
- Topological tameness conditions of spaces and groups: results and developments
- The virtual Haken conjecture (with an appendix by Ian Agol, Daniel Groves and Jason Manning).
- Equivariant, locally finite inverse representations with uniformly bounded zipping length, for arbitrary finitely presented groups
- ``Easy representations and the QSF property for groups
- The topology of four-dimensional manifolds
- Groups generated by reflections and aspherical manifolds not covered by Euclidean space
- On the WGSC property in some classes of groups.
- On the wgsc and qsf tameness conditions for finitely presented groups
- Notes on Perelman's papers
- Killing handles of index one stably, and \(\pi^ \infty_ 1\)
- Almost convex groups, Lipschitz combing, and \(\pi^ \infty _ 1\) for universal covering spaces of closed 3-manifolds
- The collapsible pseudo-spine representation theorem
- Geometry ``à la Gromov for the fundamental group of a closed 3- manifold \(M^ 3\) and the simple connectivity at infinity of \(\widetilde{M}^ 3\)
- The QSF property for groups and spaces
- On topological filtrations of groups
- On detecting Euclidean space homotopically among topological manifolds
- CASSON'S IDEA ABOUT 3-MANIFOLDS WHOSE UNIVERSAL COVER IS R3
- Equivariant, almost-arborescent representations of open simply-connected 3-manifolds; a finiteness result
- Open 3-Manifolds Which are Simply Connected at Infinity
