The paraboson Fock space and unitary irreducible representations of the Lie superalgebra S Lievens, NI Stoilov, JV der Jeugt Communications in Mathematical Physics 281 (3), 805-826, 2008 | 66 | 2008 |
Finite-dimensional representations of the quantum superalgebraU q[gl(n/m)] and relatedq-identities TD Palev, NI Stoilova, J Van der Jeugt Communications in Mathematical Physics 166, 367-378, 1994 | 56 | 1994 |
Many-body Wigner quantum systems TD Palev, NI Stoilova Journal of Mathematical Physics 38 (5), 2506-2523, 1997 | 53 | 1997 |
Finite oscillator models: the Hahn oscillator EI Jafarov, NI Stoilova, J Van der Jeugt Journal of Physics A: Mathematical and Theoretical 44 (26), 265203, 2011 | 52 | 2011 |
The-graded Lie superalgebra and new parastatistics representations NI Stoilova, J Van der Jeugt Journal of Physics A: Mathematical and Theoretical 51 (13), 135201, 2018 | 44 | 2018 |
The Hahn oscillator and a discrete Fourier–Hahn transform EI Jafarov, NI Stoilova, J Van der Jeugt Journal of Physics A: Mathematical and Theoretical 44 (35), 355205, 2011 | 42 | 2011 |
The parafermion Fock space and explicit representations NI Stoilova, J Van der Jeugt Journal of Physics A: Mathematical and Theoretical 41 (7), 075202, 2008 | 39 | 2008 |
Wigner quantum oscillators. osp (3/2) oscillators TD Palev, NI Stoilova Journal of Physics A: Mathematical and General 27 (22), 7387, 1994 | 35 | 1994 |
The non-commutative and discrete spatial structure of a 3D Wigner quantum oscillator RC King, TD Palev, NI Stoilova, J Van der Jeugt Journal of Physics A: Mathematical and General 36 (15), 4337, 2003 | 30 | 2003 |
Finite‐dimensional representations of the quantum superalgebra Uq[gl(2/2)]. II. Nontypical representations at generic q NA Ky, NI Stoilova Journal of Mathematical Physics 36 (10), 5979-6003, 1995 | 28 | 1995 |
Gel’fand–Zetlin basis and Clebsch–Gordan coefficients for covariant representations of the Lie superalgebra gl (m∣ n) NI Stoilova, J Van der Jeugt Journal of mathematical physics 51 (9), 2010 | 27 | 2010 |
Harmonic oscillator chains as Wigner quantum systems: periodic and fixed wall boundary conditions in gl (1| n) solutions S Lievens, NI Stoilova, J Van der Jeugt Journal of mathematical physics 49 (7), 2008 | 24 | 2008 |
Wigner quantum oscillators TD Palev, NI Stoilova Journal of Physics A: Mathematical and General 27 (3), 977, 1994 | 24 | 1994 |
A class of infinite-dimensional representations of the Lie superalgebra and the parastatistics Fock space NI Stoilova, J Van der Jeugt Journal of Physics A: Mathematical and Theoretical 48 (15), 155202, 2015 | 23 | 2015 |
An exactly solvable spin chain related to Hahn polynomials NI Stoilova, J Van der Jeugt SIGMA. Symmetry, Integrability and Geometry: Methods and Applications 7, 033, 2011 | 21 | 2011 |
Harmonic oscillators coupled by springs: discrete solutions as a Wigner quantum system S Lievens, NI Stoilova, J Van der Jeugt Journal of mathematical physics 47 (11), 2006 | 21 | 2006 |
Finite‐dimensional representations of the Lie superalgebra gl (2/2) in a gl (2)⊕ gl (2) basis. II. Nontypical representations TD Palev, NI Stoilova Journal of Mathematical Physics 31 (4), 953-988, 1990 | 20 | 1990 |
The Z2× Z2-graded general linear Lie superalgebra PS Isaac, NI Stoilova, J Van der Jeugt Journal of Mathematical Physics 61 (1), 2020 | 19 | 2020 |
A non-commutative n-particle 3D Wigner quantum oscillator RC King, TD Palev, NI Stoilova, J Van der Jeugt Journal of Physics A: Mathematical and General 36 (48), 11999, 2003 | 17 | 2003 |
A classification of generalized quantum statistics associated with classical Lie algebras NI Stoilova, J Van der Jeugt Journal of mathematical physics 46 (3), 2005 | 13 | 2005 |