"Virasoro algebra"의 두 판 사이의 차이
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| + | <math>L_i</math> | ||
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| + | :<math></math> for <math>i\in\mathbf{Z}</math><br><br> and ''c'' with<br><br> :<math>L_n + L_{-n}</math><br><br> and ''c'' being real elements. Here the central element ''c'' is the '''[[central charge]]'''. The algebra satisfies<br><br> :<math></math><br><br> and<br><br> :<math>[L_m,L_n]=(m-n)L_{m+n}+\frac{c}{12}(m^3-m)\delta_{m+n}.</math> | ||
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* [[vertex algebras|Vertex Algebras]] | * [[vertex algebras|Vertex Algebras]] | ||
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* [http://www.springerlink.com/content/kn757431511020g2/ Quantum Group Structure of the q-Deformed Virasoro Algebra]<br> | * [http://www.springerlink.com/content/kn757431511020g2/ Quantum Group Structure of the q-Deformed Virasoro Algebra]<br> | ||
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* [http://prola.aps.org/abstract/PRL/v52/i18/p1575_1 Conformal invariance, unitarity and critical exponents in two dimensions]<br> | * [http://prola.aps.org/abstract/PRL/v52/i18/p1575_1 Conformal invariance, unitarity and critical exponents in two dimensions]<br> | ||
** Friedan, D., Qiu, Z. and Shenker, S., Phys. Rev. Lett. 52 (1984) 1575-1578 | ** Friedan, D., Qiu, Z. and Shenker, S., Phys. Rev. Lett. 52 (1984) 1575-1578 | ||
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| + | * [http://www.springerlink.com/content/122636vk15g86472/ Verma modules over the Virasoro algebra]<br> | ||
| + | ** B.L. Feigin and D.B. Fuchs, Lecture Notes in Math. 1060 (1984), pp. 230–245. | ||
* [http://dx.doi.org/10.1016/0550-3213%2884%2990052-X Infinite conformal symmetry in two-dimensional quantum field theory]<br> | * [http://dx.doi.org/10.1016/0550-3213%2884%2990052-X Infinite conformal symmetry in two-dimensional quantum field theory]<br> | ||
** Alexander Belavin, Alexander Polyakov and Alexander Zamolodchikov, Nucl. Phys. B241 (1984) 333–380 | ** Alexander Belavin, Alexander Polyakov and Alexander Zamolodchikov, Nucl. Phys. B241 (1984) 333–380 | ||
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2010년 3월 27일 (토) 09:00 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)
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
central charge and conformal weight
- \(c\) is called the central charge
- \(h\) is sometimes called a conformal dimension or conformal weights
Virasoro algebra
- Lie algebra of vector fields on the unit circle
\(f(z)\frac{d}{dz}\)
\(L_n=-z^{n+1}\frac{d}{dz}\)
\(L_i\)
\[\] for \(i\in\mathbf{Z}\)
and c with
\[L_n + L_{-n}\]
and c being real elements. Here the central element c is the central charge. The algebra satisfies
\[\]
and
\[[L_m,L_n]=(m-n)L_{m+n}+\frac{c}{12}(m^3-m)\delta_{m+n}.\]
Verma module
- start with given c and h
- construct \(M(c,h)\)
- quotients from the Universal enveloping algebra
- tensor product from the one dimensional Borel subalgebra representations
- there exists a unique contravariant hermitian form
- contravariance means
- \(L_n\) and \(L_{-n}\) act as adjoints to each other, i.e.
\(<{L_n}v,w>=<w,L_{-n}w>\)
- \(L_n\) and \(L_{-n}\) act as adjoints to each other, i.e.
- a natural grading given by the \(L_0\)-eigenvalues
- contains a unique maximal submodule, and its quotient is the unique (up to isomorphism) irreducible representation with highest weight
- When is \(M(c,h)\) unitary?
- to understand the submodules of the Verma module, we refer to Feigin and Fuks.
unitary representations
- They are classified by c>1 and c<1 case.
- \(c> 1, h > 0\) positive definite
- \(c\geq 1, h \geq 0\) positive semi-definite
- \(0<c<1, h> 0\) with Kac determinant condition
- called the discrete series representations
character of minimal models
[/pages/3003682/attachments/1973999 전체화면_캡처_2009-08-08_오전_60339.jpg]
affine Lie algebras
- a highest weight representation V of an affine Kac-Moody algebra gives unitary representation of the Virasoro algebra
- This is because V is a unitary highest weight representation of the AKMA.
- Read chapter 4 of Kac-Raina on Wedge space
No-Ghost theorem
- refer to the No Ghost theorem
관련된 항목들
encyclopedia
- http://ko.wikipedia.org/wiki/
- http://en.wikipedia.org/wiki/Virasoro_algebra
- http://en.wikipedia.org/wiki/Coset_construction
articles
- Quantum Group Structure of the q-Deformed Virasoro Algebra
-
- Haihong Hu
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- Unitary representations of the Virasoro and super-Virasoro algebras
-
- P. Goddard, A. Kent and D. Olive, Comm. Math. Phys. 103, no. 1 (1986), 105–119.
-
- Conformal invariance, unitarity and critical exponents in two dimensions
- Friedan, D., Qiu, Z. and Shenker, S., Phys. Rev. Lett. 52 (1984) 1575-1578
- Verma modules over the Virasoro algebra
- B.L. Feigin and D.B. Fuchs, Lecture Notes in Math. 1060 (1984), pp. 230–245.
- Infinite conformal symmetry in two-dimensional quantum field theory
- Alexander Belavin, Alexander Polyakov and Alexander Zamolodchikov, Nucl. Phys. B241 (1984) 333–380