Shear and moment diagram

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.

Definitions

Let ${\displaystyle G}$ be a second countable locally compact group. The following properties are all equivalent, and any of them may be taken to be definitions of the Haagerup property:

1. There is a proper continuous conditionally negative definite function ${\displaystyle \Psi \colon G\to {\mathbb {R} }^{+}}$.
2. ${\displaystyle G}$ has the Haagerup approximation property, also known as Property ${\displaystyle C_{0}}$: there is a sequence of normalized continuous positive-definite functions ${\displaystyle \phi _{n}}$ which vanish at infinity on ${\displaystyle G}$ and converge to 1 uniformly on compact subsets of ${\displaystyle G}$.
3. There is a strongly continuous unitary representation of ${\displaystyle G}$ which weakly contains the trivial representation and whose matrix coefficients vanish at infinity on ${\displaystyle G}$.
4. There is a proper continuous affine isometric action of ${\displaystyle G}$ on a Hilbert space.

Examples

There are many examples of groups with the Haagerup property, most of which are geometric in origin. The list includes:

• All compact groups (trivially). Note all compact groups also have property (T). The converse holds as well: if a group has both property (T) and the Haagerup property, then it is compact.
• SO(n,1)
• SU(n,1)
• Groups acting properly on trees or on ${\displaystyle {\mathbb {R}}}$-trees
• Coxeter groups
• Amenable groups
• Groups acting properly on CAT(0) cubical complexes

References

• Cherix, Cowling, Jolissaint, Julg, and Valette (2001). Groups with the Haagerup Property (Gromov's a-T-menability)