Shear and moment diagram: Difference between revisions

Revision as of 04:06, 23 January 2014

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 $G$ 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:

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

@@ Line 1: / Line 1: @@
-Finding the proper legal representative is vital. Many people dislike lawyers, but we nevertheless require them if we visit judge. It only stands to reason that, when you have to possess a legal representative, you ought to have a good one to ensure that you'll have a great potential for succeeding your case. Browse the beneath post to understand tips on performing these stuff effectively.<br><br>
+In [[mathematics]], the '''Haagerup property''', named after [[Uffe Haagerup]] and also known as [[Mikhail Gromov (mathematician)|Gromov]]'s '''a-T-menability''', is a property of [[Group (mathematics)|group]]s 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.
-Stay away from a legal professional that does not have a particular part of rules they specialize in. There are attorneys around that specialize in distinct fields of examine. Selecting one of these improves your odds of achievement considering that the particular person you retain the services of will know just what they can be carrying out after they walk into the courtroom.<br><br>There is a straight to assume crystal clear, constant interaction with your legal professional. The individual must be able to give you a standard summery of what you are able count on in terms of your case, as well as what probable problems may possibly occur and what could be carried out to remedy these problems.<br><br>Maintain very good information of when you connect with your attorney. Jot downward the things you spoke about, exactly what the time and time was and anything you mentioned about monthly payments or monthly bills. You need to keep great documents of the time your attorney managed meet your needs. Then you will get good documentation should you not comprehend the expenses.<br><br>Don't give your legal professional a big retainer in the beginning. When they have a certain retainer before you take an instance, make sure to might be refunded precisely what is not utilized. Moreover, you must do your research. Plenty of legal professionals will agree to little retainers, and when there is an improvement, you will end up correctly billed because of it.<br><br>If you want authorized aid, don't actually use the lawyer you may have worked with in the past. You might need a specific sort of attorney, someone that concentrates on the sort of situation you take part in. Don't stress, however. A professional isn't automatically expensive, so that you should be able to manage the thing you need.<br><br>Cash is an issue for many individuals today, and the thought of investing in great authorized charges can feel utterly terrifying! Question your attorney if she or he may possibly take into account allowing you to repay your service fees using a repayment schedule it's entirely possible that this might be a possibility to suit your needs.<br><br>You must setup a deal with-to-face meeting with an lawyer or attorney before you decide to employ them that will help you with your situation. It can be great to talk to someone who is personable and sociable, but you really need to make inquiries if you would like  [http://www.youtube.com/watch?v=D3fHaPD5K80 car accident attorney atlanta] discover regardless of whether your legal professional understands what they are accomplishing.<br><br>Put in place a great interaction method together with your legal representative first thing. Lawyers are active people, along with your case might be one of several. In the event you haven't recognized an hope for interaction, you might be ignored. So set it up in the initially getting together with. Make sure your expectancy is obvious.<br><br>Request your legal representative for a referrer to a expert that can correctly take care of your scenario. Each [https://Www.flickr.com/search/?q=attorney attorney] has a specific specialty and you could get fantastic assistance through your general legal professional. If you're presently running a business having a particular lawyer or business, they will be more inclined to meet the needs of your requirements and provide you with top quality assistance.<br><br>Now, you should have a large amount of information about what it requires to find and employ a lawyer. As a result, you probably currently have a lower body on your adversary. Be sure to put into practice the guidelines described within the report over. The better you put together, the better your odds are when dealing with legal requirements.
+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 [[embedding|embeddable]] into a [[Hilbert space]].
+==Definitions==
+Let <math>G</math> 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:
+#There is a [[proper function|proper]] [[continuous function|continuous]] conditionally [[negative definite]] [[Function (mathematics)|function]] <math>\Psi\colon G \to \Bbb{R}^+</math>.
+#<math>G</math> has the '''Haagerup approximation property''', also known as '''Property <math>C_0</math>''':  there is a sequence of normalized continuous [[Positive-definite function on a group|positive-definite function]]s <math>\phi_n</math> which vanish at infinity on <math>G</math> and converge to 1 [[uniform convergence|uniformly]] on [[compact subset]]s of <math>G</math>.
+#There is a [[strongly continuous]] [[unitary representation]] of <math>G</math> which [[weak containment|weakly contains]] the [[trivial representation]] and whose matrix coefficients vanish at infinity on <math>G</math>.
+#There is a proper continuous affine isometric action of <math>G</math> 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 group]]s (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)|SU(n,1)]]
+*Groups acting properly on trees or on <math>\Bbb{R}</math>-trees
+*[[Coxeter groups]]
+*[[Amenable]] groups
+*Groups acting properly on [[CAT(0)]] [[cubical complex]]es
+==References==
+*Cherix, Cowling, Jolissaint, Julg, and Valette (2001).  ''Groups with the Haagerup Property (Gromov's a-T-menability)''
+[[Category:Representation theory]]
+[[Category:Geometric group theory]]

Shear and moment diagram: Difference between revisions

Revision as of 04:06, 23 January 2014

Definitions

Examples

References

Navigation menu

Search