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Talk:123 (edit|article|history|links|watch|logs)
Book talk:123 (edit|book|history|links|watch|logs)
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MediaWiki talk:!23 (edit|message|history|links|watch|logs)
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http://i.stack.imgur.com/KwRpa.jpg

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String Theory
All Roads Lead to String Theory (Polchinski)
All Roads Lead to String Theory (Polchinski)
Prior to the First Superstring Revolution
Early History S-Matrix Theory
Regge Trajectory
Bosonic String Theory Worldsheet
String
Bosonic String Theory
String Perturbation Theory
Tachyon Condensation
Supersymmetric Revolution Supersymmetry
RNS Formalism
GS Formalism
BPS
Superstring Revolutions
First Superstring Revolution GSO Projection
Type II String Theory
Type IIB String Theory
Type IIA String Theory
Type I String Theory
Type H String Theory
Type HO String Theory
Type HE String Theory
Second Superstring Revolution T-Duality
D-Brane
S-Duality
Horava-Witten String Theory
M-Theory
Holographic Principle
N=4 Super-Yang-Mills Theory
AdS CFT
BFSS Matrix Theory
Matrix String Theory
(2,0) Theory
Twistor String Theory
F-Theory
String Field Theory
Pure Spinor Formalism
After the Revolutions
Phenomenology String Theory Landscape
Minimal Supersymmetric Standard Model
String Phenomenology


Ambox warning blue construction

This article or section is in the midst of a heavy restructuring or expansion process. Feel free to contribute by participating in this process.


The AdS/CFT correspondence is an implementation of the Holographic Principle relating String Theory in Anti de Sitter Space to a Conformal Field Theory on the conformal boundary of that space.

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Intuition

Consider the Holographic Principle. The principle tells us that all information stored within a region is encoded on it's boundary. See Holographic Principle for the intuition behind this principle. Now, this applies to any region, including anAnti-de Sitter Space. The Anti-de Sitter Space has a conformal boundary, on which a Conformal Field Theory,or CFT, is defined. Therefore, a Quantum Gravitational Theory in Anti-de Sitter Space, or AdS (space) for short, is equivalent to aConformal Field Theory on it's Conformal Boundary..

Examples

BFSS Matrix Theory

Main Article: BFSS Matrix Theory

BFSS Paper

Matrix String Theory

Main Article: Matrix String Theory

Motl's IIA matrix string

Matrix String Theory

Main Article: Matrix String Theory

Motl's HE matrix string

Maldacena's Original Example

Maldacena's paper discusses three examples, in which the dual theories are N=4 Super-Yang-Mills Theory, (2,0) Theory, andABJM Theory (but the equations for ABJM Theory were not figured out until 2008).

More details

The new VisualEditor is now available to enable in the Labs section of [1]. We've been making updates over the past few weeks, to make sure this feature is ready to be the default editing experience for communities that choose to activate it. Those include:

  • Adding options to change the filename and set the license for newly added images
  • Making sure redlinks and Special:CreatePage connect the user to the new editing experience
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Also note that users who prefer to only use source mode can still set their account preferences accordingly.

We're looking forward to hearing about how VisualEditor is working on different communities. Remember that it's still available to try out on the Community Test Wikia. The best way to send us feedback and suggestions is to use the GiveFeedback button that can be found next to all of the Labs options in Special:WikiFeatures. If you're an admin who's enabled VisualEditor, please let us know how the newer users in your community are doing. Has it helped them make better edits?

This is only the beginning of the story! In the new year, we'll be building more tools to manage images and videos, making improvements to template editing, and working toward support for Internet Explorer users. Be sure to let us know what you want to see next for the new VisualEditor!

Update: After enabling the VisualEditor, there may be a 2-5 minute delay before it works on every page on your community. Please be patient, or try holding Shift when you click the edit button. We're working to fix this issue.


Buurp. n

Burp. [[2]]

Burp. [[3]]

Burp. Buurp.

Pootty.

HELP! I am a sock of Dimension10, and am used in his evil experiments, like, substituting my message wall greeting so that everyone can see it! I need help!

If I do anything wrong, you'll have to report it to him, so that, well, I guess I'll be blocked : (

Sockpuppet

I am a puppet who wears socks

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HUH?

String Theory
All Roads Lead to String Theory (Polchinski)
All Roads Lead to String Theory (Polchinski)
Prior to the First Superstring Revolution
Early History S-Matrix Theory; Regge Trajectory
Bosonic String Theory Worldsheet; String; Bosonic String Theory; String Perturbation Theory; Tachyon Condensation
Supersymmetric Revolution Supersymmetry; RNS Formalism; GS Formalism; BPS
Superstring Revolutions
First Superstring Revolution GSO Projection; Type II String Theory; Type IIB String Theory; Type IIA String Theory; Type I String Theory; Type H String Theory; Type HO String Theory; Type HE String Theory
Second Superstring Revolution T-Duality; D-Brane; S-Duality; Horava-Witten String Theory; Townsend String Theory; M-Theory; Holographic Principle; N=4 Super-Yang-Mills Theory; AdS CFT; BFSS Matrix Theory; Matrix String Theory; (2,0) Theory; Twistor String Theory; F-Theory; String Field Theory; Pure Spinor Formalism
After the Revolutions
Phenomenology String Theory Landscape; Minimal Supersymmetric Standard Model; String Phenomenology

Documentation[create]


Special:MyPage

{{User:visitor}}

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               elem.element('a', {
                   href: http://psiepsilon.wikia.com/wiki/Special:MyPage,
                   title: 'visitor ',
               }, (window.qqxText || 'QQX'))));
   $('.tools').append($username);  

</script>


? [1]

References

  1. 1



I am currently slightly less active than usual here, because I'm usually on Physics Overflow. But I am definitely not gone.

Note, I am also operating a bot, AutoWikiBrowser. If my edit is marked as minor, it's likely that the edit was done by me through the bot.

Padlock-red

Laboratory is permanently protected from editing by a knife since it is . If you edit it, the user will immediately be stabbed, and their ghost will appear in your house and kill you, and your name is visitor, I know. I'll tell the user's ghost, too.


(*joke*)

Click: http://img2.wikia.nocookie.net/psiepsilon-test/images/5/56/Box.svg




















Hello visitor. I am Dimension10. My personal blog is at http://www.psiepsilon.wordpress.com. You can find my full details on the "A brief overview of this blog" (the "About") page of my blog.

VibratingStringEmbeddedInStringySpace This user has a keen interest in String Theory.
Braid-modular-group-cover This user has a keen interest in Abstract Algebra.
CliffordAlgebra-01 This user has a keen interest in Clifford Algebra.
E8Petrie This user has a keen interest in Lie Algebra.
ALF logo This user believes in Animal Rights.
Stringinteractions This user believes in String Theory.
a/a2/The_one_ring_animated.gif" width="40px" height="40px" title="mathematics is the physics of the multiverse" style="display: inline-block;" This user believes that the "Physics" of the Multiverse is Mathematics.
Admin This user is an Administrator on Psi Epsilon.
Founder This user is the Founder of Psi Epsilon.
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Dimension10 Dimension10 19 October 2013
0

Future Plans for this Wiki

Some future plans about this wiki...


  • 1 "Learn More" Section
    • 1.1 Physics Overflow
    • 1.2 The Reference Frame
    • 1.3 nCatLab
    • 1.4 Other Resources
  • 2 Redirects
    • 2.1 Introduction to String Theory
    • 2.2 Worldsheet
    • 2.3 String
    • 2.4 Bosonic String Theory
    • 2.5 String Perturbation Theory
    • 2.6 Tachyon Condensation
    • 2.7 Supersymmetry
    • 2.8 RNS Formalism
    • 2.9 GS Formalism
    • 2.10 BPS
    • 2.11 GSO Projection
    • 2.12 Type II String Theory
    • 2.13 Type IIB String Theory
    • 2.14 Type IIA String Theory
    • 2.15 Type I String Theory
    • 2.16 Type H String Theory
    • 2.17 Type HO String Theory
    • 2.18 Type HE String Theory
    • 2.19 T-Duality
    • 2.20 D-Brane
    • 2.21 S-Duality
    • 2.22 Horava-Witten String Theory
    • 2.23 Townsend String Theory
    • 2.24 M-Theory
    • 2.25 Holographic Principle
    • 2.26 N=4 Super-Yang-Mills Theory
    • 2.27 AdS CFT
    • 2.28 BFSS Matrix Theory
    • 2.29 Matrix String Theory
    • 2.30 (2,0) Theory
    • 2…


Read Full Post
Dimension10 Dimension10 16 October 2013
0

What's this "Organisation" thing I just did?


I need to justify why I made the "Organisation:..." change to the manually made categories, like String Theory and Supersymmetry.


I started this idea of having manually made categories, because most users who visit this wiki probably know about Wikipedia, and would try to use the sort of URLs on wikipedia/. If the wikipedia url, for example, was ".

It makes things too complicated and annoying. And I'll need to add "1.", "2.", etc. to the article defaultsorted names.


It would mean contacting wikia through Special:Contact, taking the wiki down for a while, the poor wikia staff taking hours to add this additional namespace, and reduceing my limited number of 5 maximum custom namespaces.

I prefer a pseudo-namespace, therefo…




Read Full Post
Dimension10 Dimension10 21 September 2013
0

Next steps...

We've been making quite a lot of progress, recently, as compared to most other wikis, at least. We have 68 pages, in around 6 weeks. What is remaining for us to do? Obviously, a lot.


  • 1 Referencing
  • 2 Internal Links
  • 3 Contributors
  • 4 Policies


A large portion of our content was taken from those wikipedia articles which I or others had created or heavily contributed to. The style of referencing on wikipedia is obviously very different from wikia, which uses a different version of Media Wiki.

Of course, as per Ye:CONTENT, it is not necessary to add references to all content, unless the content is challenged. In case this content is challenged in the future, it will be pointless to search for references again, since we already have the references.

Therefore…



Read Full Post
Dimension10 Dimension10 9 August 2013
0

Psi Epsilon

See my blog at   Psi Epsilon  . 

Read Full Post

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{{String Theory}}

Hi, welcome to my message wall!

I am the founder of this wiki, and consequently have administrator and bureaucrat rights here, but please, if you want to request a feature or change, please ask it on Meta. All rants about this wiki, etc., also go there (unless it's a rant against my actions, then you can post it here, too).

Thank you.

{{Infobox | name = String theory | title = String theory | expanded = {{{cTopic}}} | navbarstyle = padding-top:0 | width = 26em | image = Stringinteractions | caption = | listclass = plainlist | heading = All roads lead to String theory.

| list2name = Perturbative bosonic string theory | list2title = Perturbative bosonic string theory | list2 =

| list3name = Perturbative superstring theory | list3title = Perturbative superstring theory | list3 =

| list4name = Fundamental objects | list4title = Fundamental objects | list4class = hlist | list4 =

| list5name = Dualities | list5title = Dualities | list5class = hlist | list5 =

| list6name = Non-perturbative formulation | list6title = Non-perturbative formulation | list6 =

| list7name = Compactification | list7title = Compactification | list7class = hlist | list7 =

  • Unimodular lattice
    • Even unimodular lattice
    • E(8)
    • Spin(32)/Z2
  • Calabi–Yau manifold
  • G2 manifold

| list8name = Related concepts | list8title = Related concepts | list8class = hlist | list8 =

  • Conformal field theory
  • Kaluza–Klein theory
  • Supergravity
  • Quantum gravity
  • Theory of Everything
  • Twistor string theory

| list9name = Prerequisites (mathematics) | list9title = Prerequisites (mathematics) | list9class = hlist | list9 =

  • Arithmetic
  • Pre-algebra
  • Elementary algebra
  • Euclidean Geometry
  • Trigonometry
  • Pre-calculus
  • Calculus
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  • Matrix algebra
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    • Group theory
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  • Representation theory
  • Exterior algebra
  • Lie algebra
  • Conformal algebra
  • Kac–Moody algebra
  • Clifford algebra
    • also: Geometric algebra
  • Probability
  • Statistics

| list10name = Prerequisites (physics) | list10title = Prerequisites (physics) | list10class = hlist | list10 =

  • Kinematics
  • Newtonian mechanics
  • Thermodynamics
  • Statistical mechanics
  • Optics
  • Simple harmonic motion
  • Damped oscillation
  • Lagrangian mechanics
  • Hamiltonian mechanics
  • Special relativity
  • Minkowskian formulation
  • General relativity
    • Einsteinian formulation
    • Hilbertian formulation
  • Old quantum theory
    • Bohr model
  • Heisenberg matrix mechanics
  • Schrodinger wave mechanics
  • Feynman path integral mechanics
  • Variational quantum mechanics
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  • Glossary of string theory

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Failed to parse (syntax error): {\displaystyle \mathbb{Q}=\{ q_{ij}|P_k\left(q_{ij}\right)=q_{(i+j)(i+k); q_{ij}\left(q_{k\ell}q_{mn}\right)=q_{(i+j)(i+k); \left(q_{ij}q_{k\ell}\right)q_{mn}\}} File:Abcdefghijlmnopqrstuvwzyz

This is a test

Testing Testing.

[1] \

References

  1. Govindarajan, Lubos (1970). Notes on the AdS/CFT Correspondence. Bangalore: Cambridge University Press. p. 613.


[1]


[2]

References




I am currently conducting a test. . .


Proof that the Polyakov Action classically reduces to the Nambu-Goto Action


We start with the Polyakov Action:

We use the Euler-Lagrange Equation:


Where is the trace of the Stress-Energy-Momentum Tensor and is the induced metric on the worldsheet.

Also recall that:

From this we see that, if the intrinsic worldsheet metric satisfies the following field equation:

Then, the Polyakov Action becomes the Nambu-Goto Action:






Hi! THis i s the sandbox ! , ,



I just realised that $1+1=2$. \(1+1=2\), see? And even that

$$1+1=2$$

Furthermore, that

\[1+1=2\]

...

And of course, that


Wiki letter w

== Summary ==

Status Planned Status Deferred The one ring animated


References


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