W_{1+\infty} and W(gl_N) with central charge N
暂无分享,去创建一个
V. Kac | E. Frenkel | Weiqiang Wang | A. Radul | W. Wang
[1] P. Moerbeke,et al. From the ω∞-algebra to its central extension: a τ-function approach , 1994 .
[2] Haisheng Li. Local systems of vertex operators, vertex superalgebras and modules , 1994, hep-th/9406185.
[3] Y. Matsuo,et al. Determinant formulae of quasi-finite representation of W1+∞ algebra at lower levels , 1994 .
[4] Y. Matsuo. Free fields and quasi-finite representation of W$_{1+(\infty}$) algebra , 1993, hep-th/9312192.
[5] B. Feigin,et al. Integrals of motion and quantum groups , 1993, hep-th/9310022.
[6] V. Kac,et al. Quasifinite highest weight modules over the Lie algebra of differential operators on the circle , 1993, hep-th/9308153.
[7] James Lepowsky,et al. On Axiomatic Approaches to Vertex Operator Algebras and Modules , 1993 .
[8] P. Bouwknegt,et al. Semi-infinite cohomology ofW-algebras , 1993, hep-th/9302086.
[9] K. Schoutens,et al. W symmetry in conformal field theory , 1992, hep-th/9210010.
[10] C. Trugenberger,et al. Infinite symmetry in the quantum Hall effect , 1992, hep-th/9206027.
[11] Weiqiang Wang. Rationality of Virasoro vertex operator algebras , 1993 .
[12] B. Sakita,et al. Fermions in the lowest Landau level. Bosonization, W∞ algebra, droplets, chiral bosons , 1992, hep-th/9209003.
[13] M. Niedermaier. Irrational free field resolutions forW(sl(n)) and extended Sugawara construction , 1992 .
[14] B. Feigin,et al. AFFINE KAC-MOODY ALGEBRAS AT THE CRITICAL LEVEL AND GELFAND-DIKII ALGEBRAS , 1992 .
[15] H. Kawai,et al. Infinite dimensional Grassmannian structure of two-dimensional quantum gravity , 1992 .
[16] A. Radul. Lie algebras of differential operators, their central extensions, and W-algebras , 1991 .
[17] E. Kiritsis,et al. Bosonic realization of a universal W-algebra and Z∞ parafermions , 1990 .
[18] L. Romans,et al. W ∞ and the Racah-Wigner algebra , 1990 .
[19] Yongchang Zhu. Vertex operator algebras, elliptic functions and modular forms , 1990 .
[20] F. Bais,et al. Extensions of the Virasoro Algebra Constructed from Kac-Moody Algebras Using Higher Order Casimir Invariants , 1988 .
[21] B. Feigin,et al. Cohomology of some nilpotent subalgebras of the Virasoro and Kac-Moody Lie algebras , 1988 .
[22] V. Fateev,et al. Conformally Invariant Models of Two-dimensional {QFT} With $Z(N$) Symmetry , 1987 .
[23] R. Borcherds. Vertex algebras, Kac-Moody algebras, and the Monster. , 1986, Proceedings of the National Academy of Sciences of the United States of America.
[24] Alexander B. Zamolodchikov,et al. Infinite additional symmetries in two-dimensional conformal quantum field theory , 1985 .
[25] V. Kac. Infinite Dimensional Lie Algebras , 1983 .
[26] I. Frenkel. Representations of affine lie algebras, hecke modular forms and korteweg—De vries type equations , 1982 .
[27] V. Kac,et al. Spin and wedge representations of infinite-dimensional Lie algebras and groups. , 1981, Proceedings of the National Academy of Sciences of the United States of America.
[28] V. Kac. An elucidation of "Infinite dimensional algebras. . .and the very strange formula , 1980 .
[29] V. Kac,et al. Basic representations of affine Lie algebras and dual resonance models , 1980 .
[30] I. G. MacDonald,et al. Symmetric functions and Hall polynomials , 1979 .
[31] V. Kac. Contravariant form for infinite-dimensional Lie algebras and superalgebras , 1979 .
[32] F. Smithies. Infinite-Dimensional Algebras , 1961, Nature.