Haagerup property
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.
known for
Wikipage redirect
Link from a Wikipage to another Wikipage
known for
primaryTopic
Haagerup property
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.
has abstract
In mathematics, the Haagerup p ...... beddable into a Hilbert space.
@en
Wikipage page ID
15,970,956
page length (characters) of wiki page
Wikipage revision ID
1,004,427,472
Link from a Wikipage to another Wikipage
wikiPageUsesTemplate
hypernym
type
comment
In mathematics, the Haagerup p ...... y, and geometric group theory.
@en
label
Haagerup property
@en