Virasoro algebra
imported>Pythagoras0님의 2014년 5월 27일 (화) 18:32 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)
- representation theory (see
- highest weight representation of Vir)
- full classification of all CFT's for c<1
- no classification for c>1
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
- 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
- unitary representations of affine Kac-Moody algebras
character of minimal models
No-Ghost theorem
관련된 항목들
매스매티카 파일 및 계산 리소스
- https://docs.google.com/file/d/0B8XXo8Tve1cxNHBISlk2T1E1cVU/edit
- http://ask.sagemath.org/question/3289/a-sage-implementation-of-the-virasoro-algebra-and
encyclopedia
questions
exposition
- Douglas Lundholm, The Virasoro algebra and its representations in physics , January 10, 2005
articles
- Millionschikov, Dmitry. “Singular Virasoro Vectors and Lie Algebra Cohomology.” arXiv:1405.6734 [math], May 26, 2014. http://arxiv.org/abs/1405.6734.
- Hu, Haihong. “Quantum Group Structure of the Q-Deformed Virasoro Algebra.” Letters in Mathematical Physics 44, no. 2 (April 1, 1998): 99–103. doi:10.1023/A:1007475521529. http://www.springerlink.com/content/kn757431511020g2/
- Goddard, P., A. Kent, and D. Olive. “Unitary Representations of the Virasoro and Super-Virasoro Algebras.” Communications in Mathematical Physics 103, no. 1 (1986): 105–19. http://projecteuclid.org/DPubS?service=UI&version=1.0&verb=Display&handle=euclid.cmp/1104114626
- Friedan, Daniel, Zongan Qiu, and Stephen Shenker. “Conformal Invariance, Unitarity, and Critical Exponents in Two Dimensions.” Physical Review Letters 52, no. 18 (April 30, 1984): 1575–78. doi:10.1103/PhysRevLett.52.1575. http://prola.aps.org/abstract/PRL/v52/i18/p1575_1
- Feigin, B. L., and D. B. Fuchs. “Verma Modules over the Virasoro Algebra.” In Topology, edited by Ludwig D. Faddeev and Arkadii A. Mal’cev, 230–45. Lecture Notes in Mathematics 1060. Springer Berlin Heidelberg, 1984. http://link.springer.com/chapter/10.1007/BFb0099939.
- Belavin, A. A., A. M. Polyakov, and A. B. Zamolodchikov. “Infinite Conformal Symmetry in Two-Dimensional Quantum Field Theory.” Nuclear Physics B 241, no. 2 (July 23, 1984): 333–80. doi:10.1016/0550-3213(84)90052-X.