- Realizations of coupled vectors in the tensor product of representations of su(1; 1) and su(2)
- Paraboson coherent states R. Chakrabarti,1
- A classification of generalized quantum statistics associated with classical Lie algebras
- Representations of the Lie Superalgebra gl(1|n) and Wigner Quantum Oscillators
- The Wigner distribution function for the one-dimensional parabose oscillator
- Lie Theory and Its Applications in Physics VII ed. V.K. Dobrev et al, Heron Press, Sofia, 2008
- On the eigenvalue problem for arbitrary odd elements of the Lie superalgebra gl(1|n) and applications
- Representations of the Lie Superalgebra gl(1|n) in a Gel'fand-Zetlin Basis and Wigner Quantum Oscillators
- Invariance Groups of Three Term Transformations for Basic Hypergeometric Series
- A character formula for atypical critical gl(m|n) representations labelled by composite partitions
- A classification of generalized quantum statistics associated with the exceptional Lie (super)algebras
- Finite-dimensional solutions of coupled harmonic oscillator quantum systems
- Quantum communication and state transfer in spin Joris Van der Jeugt
- Macroscopic properties of Astatistics and Asuperstatistics T D Palevz and J Van der Jeugt
- Harmonic oscillators coupled by springs: discrete solutions as a Wigner Quantum System
- Lie Theory and Its Applications in Physics VII eds. H.-D. Doebner and V.K. Dobrev, Heron Press, Sofia, 2008
- Journal of Lie Theory # ?? Heldermann Verlag Berlin
- Symmetry Groups of Bailey's Transformations for 109-series S. Lievens and J. Van der Jeugt
- December 15, 2003 9:43 WSPC/Trim Size: 9in x 6in for Proceedings MoensJeugt ON CHARACTERS AND DIMENSION FORMULAS FOR
- Lie algebraic generalization of quantum statistics N.I. Stoilova1 and J. Van der Jeugt
- The N-particle Wigner Quantum Oscillator: non-commutative coordinates and physical properties
- A classification of generalized quantum statistics associated with basic classical Lie superalgebras
- All fundamental fermions fit inside one su(1|5) irreducible representation
- Lie Theory and Its Applications in Physics VI ed. V.K. Dobrev et al, Heron Press, Sofia, 2006
- Lie Theory and Its Applications in Physics VI ed. V.K. Dobrev et al, Heron Press, Sofia, 2006
- The parafermion Fock space and explicit so(2n + 1) representations N.I. Stoilova and J. Van der Jeugt
- A class of unitary irreducible representations of the Lie superalgebra osp(1|2n)
- A linear chain of interacting harmonic oscillators: solutions as a Wigner Quantum System
- Algebraic generalization of quantum statistics N.I. Stoilova 1 and J. Van der Jeugt
- Representations of the orthosymplectic Lie superalgebra osp(1|4) and paraboson coherent states
- Parafermions, parabosons and representations of so() and osp(1|)
- Quantum communication through a spin chain with interaction determined by a Jacobi matrix
- Parabosons, parafermions, and explicit representations of infinite-dimensional algebras
- Gel'fand-Zetlin Basis and Clebsch-Gordan Coefficients for Covariant Representations of the Lie superalgebra gl(m|n)
- Lie Theory and Its Applications in Physics VII eds. H.-D. Doebner and V.K. Dobrev, Heron Press, Sofia, 2008
- Wigner quantization of some one-dimensional Hamiltonians G. Regniers , and J. Van der Jeugt
- The non-commutative and discrete spatial structure of a 3D Wigner quantum oscillator
- Solutions of the compatibility conditions for a Wigner quantum oscillator
- Harmonic oscillator chains as Wigner Quantum Systems: periodic and fixed wall boundary conditions in gl(1|n) solutions.
- The finite group of the Kummer solutions S. Lievens, K. Srinivasa Rao
- 3nj-coecients of su(1; 1) as connection coecients between orthogonal polynomials in n variables
- Spectrum generating functions for non-canonical quantum oscillators
- Analytically solvable Hamiltonians for quantum systems with a nearest neighbour interaction
- The su(2) Hahn oscillator and a discrete Hahn-Fourier transform E.I. Jafarov1, N.I. Stoilova2 and J. Van der Jeugt
- Angular momentum decomposition of the three-dimensional Wigner harmonic oscillator
- ALGEBRA, GEOMETRY AND MATHEMATICAL PHYSICS BANACH CENTER PUBLICATIONS, VOLUME 93
- BANACH CENTER PUBLICATIONS, VOLUME ** INSTITUTE OF MATHEMATICS
