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Quasiprimary composite fields and null vectors in critical Ising‐type models
1.A. A. Belavin, A. M. Polyakov, and A. B. Zamolodchikov, “Infinite conformal symmetry in two dimensional quantum field theory,” Nucl. Phys. B 241, 333 (1984).
2.Vl. D. Dotsenko and V. A. Fateev, “Conformal algebra and multi‐point correlation functions in 2D statistical models,” Nucl. Phys. B 240, 312 (1984);
2.Vl. D. Dotsenko and V. A. Fateev, “Four‐point correlation functions and the operator algebra in 2D conformal invariant theories with central charge ,” Nucl. Phys. B 251, 691 (1985);
2.Vl. D. Dotsenko and V. A. Fateev, Phys. Lett. B 154, 291 (1985).
3.V. G. Kac, “Contravariant form for infinite dimensional Lie algebras and superalgebras,” Lecture Notes in Physics, Vol. 94 (Springer, Berlin, 1979), pp. 441–445.
4.D. Friedan, Z. Qiu, and S. Shenker, “Conformal invariance, unitarity, and critical exponents in two dimensions,” Phys. Rev. Lett. 52, 1575 (1984).
5.P. Goddard, A. Kent, and D. Olive, “Unitary representations of the Virasoro and super‐Virasoro algebras,” Commun. Math. Phys. 103, 105 (1986).
6.V. G. Kac and M. Wakimoto, “Unitarizable highest weight representations of the Virasoro, Neveu‐Schwarz, and Ramond algebras,” IHES preprint, Bures‐sur‐Yvette, November 1985 (to be published in Lect. Notes Phys.).
7.C. Itzykson and J. B. Zuber, “Two‐dimensional conformal invariant theories on a torus,” Nucl. Phys. B 275, 561 (1986).
8.I. T. Todorov, “Current algebra approach to conformal invariant two‐dimensional models,” Phys. Lett. B 153, 77 (1985);
8.I. T. Todorov, “Algebraic approach to conformal invariant 2‐dimensional models,” Bulg. J. Phys. 12, 3 (1985);
8.“Infinite Lie algebras in 2‐dimensional conformal field theory,” in Differential Geometric Methods in Theoretical Physics, edited by H. D. Doebner and T. D. Palev (World Scientific, Singapore, 1986), pp. 297–347.
9.I. T. Todorov, “Infinite dimensional Lie algebras in conformal QFT models,” ISAS preprint 35/86/EP Trieste (to be published in Lect. Notes Phys.).
10.G. M. Sotkov, I. T. Todorov, and V. Yu. Trifonov, “Quasiprimary composite fields and operator product expansions in 2‐dimensional conformal models,” Lett. Math. Phys. 12, 127 (1986).
11.G. M. Sotkov, I. T. Todorov, M. S. Stanishkov, and V. Yu. Trifonov, “Higher symmetries in conformal QFT models,” Lecture at the Symposium on Topological and Geometrical Methods in Field Theory, Espoo, Finland, June 1986 (World Scientific, Singapore, to be published).
12.V. Trifonov, private communication and paper in preparation.
13.A. B. Zamolodchikov (unpublished);
13.D. Friedan, Z. Qiu, and S. Shenker, “Superconformal invariance in two dimensions and the tricritical Ising model,” Phys. Lett. B 151, 37 (1985).
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