"Virasoro algebra"의 두 판 사이의 차이

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<h5>Verma module</h5>
 
<h5>Verma module</h5>
  
* start with given c and h
+
* [[highest weight representation of Vir]]
*  construct <math>M(c,h)</math><br>
 
** quotients from the Universal enveloping algebra
 
** tensor product from the one dimensional Borel subalgebra representations
 
* there exists a unique contravariant hermitian form
 
* http://mathworld.wolfram.com/HermitianForm.html
 
* http://en.wikipedia.org/wiki/Hermitian_adjoint
 
* http://en.wikipedia.org/wiki/Hermitian_form#Hermitian_form
 
*  contravariance means<br>
 
** <math>L_n</math> and <math>L_{-n}</math> act as adjoints to each other, i.e.<br><math><{L_n}v,w>=<w,L_{-n}w></math><br>
 
* a natural grading given by the <math>L_0</math>-eigenvalues
 
* contains a unique maximal submodule, and its quotient is the unique (up to isomorphism) irreducible representation with highest weight
 
* When is <math>M(c,h)</math> unitary? 
 
* to understand the submodules of the Verma module, we refer to Feigin and Fuks.
 
  
 
 
 
 
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* [[highest weight representation of Vir]]
 
* [[highest weight representation of Vir]]
*  They are classified by c>1 and c<1 case.<br>
 
** <math>c> 1, h > 0</math> positive definite
 
** <math>c\geq 1, h \geq 0</math> positive semi-definite
 
** <math>0<c<1, h> 0</math> with [[Kac determinant formula|Kac determinant]] condition<br>
 
*** called [[discrete series unitary representations|the discrete series representations]] or [[minimal models]]
 
  
 
 
 
 

2010년 9월 25일 (토) 00:54 판

introduction
  • Virasoro algebra could be pre-knowledge for the study of CFT
  • important results on Virasoro algebra are
    • (i)Kac Determinant Formula
    • (ii) discrete series (A. J. Wassermann, Lecture Notes on the Kac-Moody and Virasoro algebras)
    • (iii) GKO construction of discrete series (this is added on 22nd of Oct, 2007)

 

 

Virasoro algebra
  • Lie algebra of vector fields on the unit circle
    \(f(z)\frac{d}{dz}\)
  • commutator
    \([f(z)\frac{d}{dz},g(z)\frac{d}{dz}]=(fg'-f'g)\frac{d}{dz}\)
  • Virasoro generators
    \(L_n=-z^{n+1}\frac{d}{dz}\)
  • they satisfy the following relation (Witt algebra)
    \([L_m,L_n]=(m-n)L_{m+n}\)
  • Homological algebra tells that there is 1-dimensional central extension of Witt algebra
  • taking a central extension of lie algebras, we get the Virasoro algebra
    \(L_n,n\in \mathbb{Z}\)
    \([c,L_n]=0\)
    \([L_m,L_n]=(m-n)L_{m+n}+\frac{c}{12}(m^3-m)\delta_{m+n}\)

 

 

central charge and conformal weight
  • highest weight representation
  • \(c\) is called the central charge
  • \(h\) is sometimes called a conformal dimension or conformal weights

 

 

Verma module

 

 

unitarity and ghost
  • unitarity means the inner product in the space of states is positive definite (or semi-positive definite)
  • A state with negative norm is called a ghost.
  • If a ghost is found on any level the represetation cannot occur in a unitary theory

 

 

unitary irreducible representations

 

 

affine Lie algebras

 

 

character of minimal models

 

 

No-Ghost theorem

 

 

관련된 항목들

 

 

encyclopedia

 

 

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