Articles dans des revues avec comité de lecture (213)
97.
Bagchi, B., Mallik, S. H., Quesne, C., & Roychoudhury, R. (2001). A PT-symmetric QES partner to the Khare-Mandal potential with real eigenvalues. Physics letters. A, 289(1-2), 34-38. doi:10.1016/S0375-9601(01)00578-3
98.
Quesne, C. (2001). Completeness of photon-added squeezed vacuum and one-photon states and of photon-added coherent states on a circle. Physics letters. A, 288(5-6), 241-250. doi:10.1016/S0375-9601(01)00554-0
99.
Bagchi, B., Mallik, S. H., & Quesne, C. (2001). Generating complex potentials with real eigenvalues in supersymmetric quantum mechanics. International journal of modern physics A, 16(16), 2859-2872. doi:10.1142/S0217751X01004153
100.
Bagchi, B., & Quesne, C. (2000). sl(2,C) as a complex lie algebra and the associated non-Hermitian Hamiltonians with real eigenvalues. Physics letters. A, 273(5-6), 285-292. doi:10.1016/S0375-9601(00)00512-0
101.
Quesne, C. (2000). Spectrum generating algebra of the C(λ)-extended oscillator and multiphoton coherent states. Physics letters. A, 272(5-6), 313-325. doi:10.1016/S0375-9601(00)00457-6
102.
Del Sol Mesa, A., & Quesne, C. (2000). Connection between type A and E factorizations and construction of satellite algebras. Journal of Physics A: Mathematical and General, 33(22), 4059-4071.
103.
Bagchi, B., Cannata, F., & Quesne, C. (2000). PT-symmetric sextic potentials. Physics letters. A, 269(2-3), 79-82. doi:10.1016/S0375-9601(00)00227-9
104.
Quesne, C., & Vansteenkiste, N. (2000). Cλ-extended oscillator algebras and some of their deformations and applications to quantum mechanics. International journal of theoretical physics, 39(5), 1175-1215.
105.
Irac-Astaud, M., & Quesne, C. (2000). suq(2)-invariant harmonic oscillator. Czechoslovak Journal of Physics, 50(1), 91-96.
106.
Irac-Astaud, M., & Quesne, C. (1999). suq(2)-invariant Schrödinger equation of the three-dimensional harmonic oscillator. letters in mathematical physics, 50(3), 163-176.
107.
Quesne, C. (1999). Interpretation and extension of Green's ansatz for paraparticles. Physics letters. A, 260(6), 437-440.
108.
Quesne, C. (1999). Application of nonlinear deformation algebra to a physical system with Pöschl-Teller potential. Journal of Physics A: Mathematical and General, 32(38), 6705-6710.