Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Haagerup_property> ?p ?o }
Showing triples 1 to 55 of
55
with 100 triples per page.
- Haagerup_property abstract "In mathematics, the Haagerup property, named after Uffe Haagerup and also known as Gromov's a-T-menability, is a property of groups that is a strong negation of Kazhdan's property (T). Property (T) is considered a representation-theoretic form of rigidity, so the Haagerup property may be considered a form of strong nonrigidity; see below for details.The Haagerup property is interesting to many fields of mathematics, including harmonic analysis, representation theory, operator K-theory, and geometric group theory. Perhaps its most impressive consequence is that groups with the Haagerup Property satisfy the Baum–Connes conjecture and the related Novikov conjecture. Groups with the Haagerup property are also uniformly embeddable into a Hilbert space.".
- Haagerup_property wikiPageID "15970956".
- Haagerup_property wikiPageLength "3017".
- Haagerup_property wikiPageOutDegree "38".
- Haagerup_property wikiPageRevisionID "670497501".
- Haagerup_property wikiPageWikiLink Amenable_group.
- Haagerup_property wikiPageWikiLink Baum–Connes_conjecture.
- Haagerup_property wikiPageWikiLink CAT(k)_space.
- Haagerup_property wikiPageWikiLink Category:Geometric_group_theory.
- Haagerup_property wikiPageWikiLink Category:Representation_theory.
- Haagerup_property wikiPageWikiLink Compact_group.
- Haagerup_property wikiPageWikiLink Compact_space.
- Haagerup_property wikiPageWikiLink Continuous_function.
- Haagerup_property wikiPageWikiLink Coxeter_group.
- Haagerup_property wikiPageWikiLink Cubical_complex.
- Haagerup_property wikiPageWikiLink David_Kazhdan.
- Haagerup_property wikiPageWikiLink Definite_quadratic_form.
- Haagerup_property wikiPageWikiLink Embedding.
- Haagerup_property wikiPageWikiLink Function_(mathematics).
- Haagerup_property wikiPageWikiLink Geometric_group_theory.
- Haagerup_property wikiPageWikiLink Group_(mathematics).
- Haagerup_property wikiPageWikiLink Harmonic_analysis.
- Haagerup_property wikiPageWikiLink Hilbert_space.
- Haagerup_property wikiPageWikiLink Indefinite_orthogonal_group.
- Haagerup_property wikiPageWikiLink Kazhdans_property_(T).
- Haagerup_property wikiPageWikiLink Locally_compact_space.
- Haagerup_property wikiPageWikiLink Mathematics.
- Haagerup_property wikiPageWikiLink Mikhail_Leonidovich_Gromov.
- Haagerup_property wikiPageWikiLink Novikov_conjecture.
- Haagerup_property wikiPageWikiLink Operator_K-theory.
- Haagerup_property wikiPageWikiLink Positive-definite_function_on_a_group.
- Haagerup_property wikiPageWikiLink Proper_map.
- Haagerup_property wikiPageWikiLink Representation_theory.
- Haagerup_property wikiPageWikiLink Second-countable_space.
- Haagerup_property wikiPageWikiLink Special_unitary_group.
- Haagerup_property wikiPageWikiLink Strong_topology.
- Haagerup_property wikiPageWikiLink Trivial_representation.
- Haagerup_property wikiPageWikiLink Uffe_Haagerup.
- Haagerup_property wikiPageWikiLink Uniform_convergence.
- Haagerup_property wikiPageWikiLink Unitary_representation.
- Haagerup_property wikiPageWikiLink Weak_containment.
- Haagerup_property wikiPageWikiLinkText "Haagerup property".
- Haagerup_property wikiPageUsesTemplate Template:Citation.
- Haagerup_property subject Category:Geometric_group_theory.
- Haagerup_property subject Category:Representation_theory.
- Haagerup_property hypernym Property.
- Haagerup_property type Building.
- Haagerup_property type Field.
- Haagerup_property comment "In mathematics, the Haagerup property, named after Uffe Haagerup and also known as Gromov's a-T-menability, is a property of groups that is a strong negation of Kazhdan's property (T).".
- Haagerup_property label "Haagerup property".
- Haagerup_property sameAs Q5636478.
- Haagerup_property sameAs m.03qjl20.
- Haagerup_property sameAs Q5636478.
- Haagerup_property wasDerivedFrom Haagerup_property?oldid=670497501.
- Haagerup_property isPrimaryTopicOf Haagerup_property.