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- Rips_machine abstract "In geometric group theory, the Rips machine is a method of studying the action of groups on R-trees. It was introduced in unpublished work of Eliyahu Rips in about 1991.An R-tree is a uniquely arcwise-connected metric space in which every arc is isometric to some real interval. Rips proved the conjecture of Morgan & Shalen (1991) that any finitely generated group acting freely on an R-tree is a free product of free abelian and surface groups (Bestvina & Feighn 1995).".
- Rips_machine wikiPageID "31275945".
- Rips_machine wikiPageLength "6658".
- Rips_machine wikiPageOutDegree "31".
- Rips_machine wikiPageRevisionID "642512987".
- Rips_machine wikiPageWikiLink Arcwise-connected.
- Rips_machine wikiPageWikiLink Bass–Serre_theory.
- Rips_machine wikiPageWikiLink Category:Geometric_group_theory.
- Rips_machine wikiPageWikiLink Category:Hyperbolic_geometry.
- Rips_machine wikiPageWikiLink Category:Trees_(topology).
- Rips_machine wikiPageWikiLink Connected_space.
- Rips_machine wikiPageWikiLink Eliyahu_Rips.
- Rips_machine wikiPageWikiLink Euler_characteristic.
- Rips_machine wikiPageWikiLink Finitely_generated_group.
- Rips_machine wikiPageWikiLink Free_product.
- Rips_machine wikiPageWikiLink Generating_set_of_a_group.
- Rips_machine wikiPageWikiLink Geometric_group_theory.
- Rips_machine wikiPageWikiLink Geometric_topology.
- Rips_machine wikiPageWikiLink Geometrization_conjecture.
- Rips_machine wikiPageWikiLink Gromov-Hausdorff_convergence.
- Rips_machine wikiPageWikiLink Gromov–Hausdorff_convergence.
- Rips_machine wikiPageWikiLink Group_(mathematics).
- Rips_machine wikiPageWikiLink Group_action.
- Rips_machine wikiPageWikiLink Haken_manifold.
- Rips_machine wikiPageWikiLink Hyperbolic_group.
- Rips_machine wikiPageWikiLink Inventiones_Mathematicae.
- Rips_machine wikiPageWikiLink Karen_Vogtmann.
- Rips_machine wikiPageWikiLink Kleinian_group.
- Rips_machine wikiPageWikiLink Limit_group.
- Rips_machine wikiPageWikiLink Marc_Culler.
- Rips_machine wikiPageWikiLink Metric_space.
- Rips_machine wikiPageWikiLink Real_tree.
- Rips_machine wikiPageWikiLink Springer-Verlag.
- Rips_machine wikiPageWikiLink Springer_Science+Business_Media.
- Rips_machine wikiPageWikiLink Teichmüller_space.
- Rips_machine wikiPageWikiLink Topology_(journal).
- Rips_machine wikiPageWikiLink Ultralimit.
- Rips_machine wikiPageWikiLink Word-hyperbolic_group.
- Rips_machine wikiPageWikiLinkText "Rips machine".
- Rips_machine hasPhotoCollection Rips_machine.
- Rips_machine wikiPageUsesTemplate Template:Citation.
- Rips_machine wikiPageUsesTemplate Template:Harv.
- Rips_machine wikiPageUsesTemplate Template:Harvtxt.
- Rips_machine subject Category:Geometric_group_theory.
- Rips_machine subject Category:Hyperbolic_geometry.
- Rips_machine subject Category:Trees_(topology).
- Rips_machine hypernym Method.
- Rips_machine type Software.
- Rips_machine type Surface.
- Rips_machine comment "In geometric group theory, the Rips machine is a method of studying the action of groups on R-trees. It was introduced in unpublished work of Eliyahu Rips in about 1991.An R-tree is a uniquely arcwise-connected metric space in which every arc is isometric to some real interval. Rips proved the conjecture of Morgan & Shalen (1991) that any finitely generated group acting freely on an R-tree is a free product of free abelian and surface groups (Bestvina & Feighn 1995).".
- Rips_machine label "Rips machine".
- Rips_machine sameAs m.0gjb6vw.
- Rips_machine sameAs Q7335750.
- Rips_machine sameAs Q7335750.
- Rips_machine sameAs Rips_machine.
- Rips_machine wasDerivedFrom Rips_machine?oldid=642512987.
- Rips_machine isPrimaryTopicOf Rips_machine.