2D fractional supersymmetry and conformal field theory for alternative statistics

[1]  A. Macfarlane,et al.  Geometrical Foundations of Fractional Supersymmetry , 1996, hep-th/9610087.

[2]  P. Simon,et al.  2D fractional supersymmetry for rational conformal field theory: Application for third-integer spin states , 1996, hep-th/9603149.

[3]  J. A. Azcárraga,et al.  Group theoretical foundations of fractional supersymmetry , 1995, hep-th/9506177.

[4]  L. Colatto,et al.  On q‐deformed supersymmetric classical mechanical models , 1995, hep-th/9504101.

[5]  N. Fleury,et al.  Local Fractional Supersymmetry for Alternative Statistics , 1995, hep-th/9510108.

[6]  M. B. Sedra,et al.  On D= 2 (1/3,1/3) supersymmetric theories. I , 1995 .

[7]  N. Debergh On a q-deformation of the supersymmetric Witten model , 1993 .

[8]  Stéphane Durand Fractional supersymmetry and quantum mechanics , 1993, hep-th/9305128.

[9]  M. Monteiro,et al.  Quantum group generalization of the heterotic QFT , 1993 .

[10]  S. Tye,et al.  Construction of the K = 8 fractional superconformal algebras , 1992, hep-th/9202007.

[11]  N. Fleury,et al.  Linearization of polynomials , 1992 .

[12]  Don Zagier,et al.  Realizability of a model in infinite statistics , 1992 .

[13]  J. Bagger,et al.  Supersymmetry and Supergravity , 1992 .

[14]  S. Tye,et al.  Structure constants of the fractional supersymmetry chiral algebras , 1991 .

[15]  Greenberg Particles with small violations of Fermi or Bose statistics. , 1991, Physical review. D, Particles and fields.

[16]  E. Floratos,et al.  Path integral on the quantum plane , 1991 .

[17]  D. Bernard,et al.  Fractional Supersymmetries in Perturbed Coset Cfts and Integrable Soliton Theory , 1990 .

[18]  R. Mohapatra,et al.  Infinite statistics and a possible small violation of the Pauli principle , 1990 .

[19]  Greenberg Example of infinite statistics. , 1990, Physical review letters.

[20]  A. J. Macfarlane,et al.  On q-analogues of the quantum harmonic oscillator and the quantum group SU(2)q , 1989 .

[21]  C. Bachas,et al.  4D fermionic superstrings with arbitrary twists , 1988 .

[22]  Bagger,et al.  Virasoro algebras with central charge c>1. , 1988, Physical review letters.

[23]  Zongan Qiu,et al.  Current Algebra and Conformal Discrete Series , 1988 .

[24]  F. Bais,et al.  COSET CONSTRUCTION FOR EXTENDED VIRASORO ALGEBRAS , 1988 .

[25]  F. Bais,et al.  Extensions of the Virasoro Algebra Constructed from Kac-Moody Algebras Using Higher Order Casimir Invariants , 1988 .

[26]  V. Fateev,et al.  Conformal quantum field theory models in two dimensions having Z3 symmetry , 1987 .

[27]  C. Bachas,et al.  Four-dimensional superstrings , 1987 .

[28]  P. Goddard,et al.  Kac-Moody and Virasoro Algebras in Relation to Quantum Physics , 1986 .

[29]  Alexander B. Zamolodchikov,et al.  Infinite additional symmetries in two-dimensional conformal quantum field theory , 1985 .

[30]  A. Kwasniewski Clifford‐ and Grassmann‐like algebras—Old and new , 1985 .

[31]  A. Kent,et al.  Virasoro algebras and coset space models , 1985 .

[32]  S. Shenker,et al.  Superconformal invariance in two dimensions and the tricritical Ising model , 1985 .

[33]  A. Polyakov,et al.  Infinite Conformal Symmetry in Two-Dimensional Quantum Field Theory - Nucl. Phys. B241, 333 (1984) , 1984 .

[34]  E. Stephenson,et al.  Tensor polarization in. pi. -d scattering and pion absorption , 1984 .

[35]  S. Kamefuchi,et al.  Quantum field theory and parastatistics , 1982 .

[36]  R. Kavanagh,et al.  The lifetime of the lowest 5− state in 38Ar measured by recoil-distance and doppler-shift techniques , 1972 .