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References
A. Belavin, A.M. Polyakov and A. Zamolodchikov: Nucl. Phys. B 241 (1984) 33.
D. Friedan and S. Shenker: Nucl. Phys. B 281 (1987) 509.
G. Segal. The definitions of Conformal field theory, talk at the Intern. Congress of Mathematical Physics (Swansea, 1988), prerint MPI/87-58.
L. Alvarez-Gaume, C. Gomez and C. Reina: Phys. Lett. B 190 (1987) 55.
L. Alvarez-Gaume, C. Gomez, G. Moore, and C. Vafa: Nuc. Phys. B 303 (1988) 455.
G. Moore and N. Seiberg: Phys. Lett. 212 B (1988) 451., Nucl. Phys. B 313 (1989) 16, Comm. Math. Phys. 123 (1989) 77.
E. Witten: “Gauge Theories, Vertex Models, and Quantum Groups”, IASSNS-HEP-89/32.
V. Pasquier: Commun. Math. Phys. 118 (1988) 355.
V.G. Drinfel'd: “Quantum Groups”, Proceedings of the International Congress of Mathematicians. Berkeley Cal. 1986; N. Yu. Reshetikhin: “Quantized Universal Enveloping Algebras and Invariants of Links I, II”. LOMI-3-4-87, E-17–87.
G. Lusztig: “Modular Representations of Quantum Groups”, MITPreprint 1988.
V. Pasquier and M. Saleur: Symmetries of the XXZ Chain and Quantum Groups. Saclay. SPhT/88-187.
L. Alvarez-Gaume, C. Gomez and G. Sierra: Phys. Lett. 220 B (1989) 142.
L. Alvarez-Gaume, C. Gomez and G. Sierra: “Duality and Quantum Groups”, CERN Preprint-TH5369/89.
H. Wenzl: Invent. Math. 92 (1988) 349.
V.F.R. Jones: Invent. Math. 72 (1983) 1. F.M. Goodman, P. de la Harpe and V.F.R. Jones-“Coxeter-Dynkin diagrams and towers of algebras”, MSRI Publications, Springer-Verlag 1989.
C. Gomez and G. Sierra: “Towers of algebras in Rational Conformal Field Theories”, CERN-TH. 5535/89.
A. Ocneanu: “Quantized Groups, String algebras, and Galois Theory for algebras”. London Math. Soc. Lecture Notes Series 136 (1989).
A.N. Schellekens and S. Yankielowicz-CERN.TH 5344/89; CERN. TH 5416/89.
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Gómez, C. (1990). Comments on rational conformal field theory, quantum groups and tower of algebras. In: Doebner, H.D., Hennig, J.D. (eds) Quantum Groups. Lecture Notes in Physics, vol 370. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-53503-9_50
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DOI: https://doi.org/10.1007/3-540-53503-9_50
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