Your search keyword '"Ojeda-Guillén, D."' showing total 3 results

1. Landau levels for the (2 + 1) Dunkl–Klein–Gordon oscillator.

Author

Mota, R. D., Ojeda-Guillén, D., Salazar-Ramírez, M., and Granados, V. D.

Subjects

*LIE algebras, *REPRESENTATION theory, *MAGNETIC fields, *EIGENFUNCTIONS

Abstract

In this paper, we study the (2 + 1)-dimensional Klein–Gordon oscillator coupled to an external magnetic field, in which we change the standard partial derivatives for the Dunkl derivatives. We find the energy spectrum (Landau levels) in an algebraic way, by introducing three operators that close the su(1, 1) Lie algebra and from the theory of unitary representations. Also, we find the energy spectrum and the eigenfunctions analytically, and we show that both solutions are consistent. Finally, we demonstrate that when the magnetic field vanishes or when the parameters of the Dunkl derivatives are set to zero, our results are adequately reduced to those reported in the literature. [ABSTRACT FROM AUTHOR]

Published

2021

2. Algebraic approach for the one-dimensional Dirac–Dunkl oscillator.

Author

Ojeda-Guillén, D., Mota, R. D., Salazar-Ramírez, M., and Granados, V. D.

Subjects

*DIRAC equation, *REPRESENTATION theory, *DIFFERENTIAL equations, *LIE algebras, *EIGENFUNCTIONS

Abstract

We extend the (1 + 1)-dimensional Dirac–Moshinsky oscillator by changing the standard derivative by the Dunkl derivative. We demonstrate in a general way that for the Dirac–Dunkl oscillator be parity invariant, one of the spinor component must be even, and the other spinor component must be odd, and vice versa. We decouple the differential equations for each of the spinor component and introduce an appropriate su(1, 1) algebraic realization for the cases when one of these functions is even and the other function is odd. The eigenfunctions and the energy spectrum are obtained by using the su(1, 1) irreducible representation theory. Finally, by setting the Dunkl parameter to vanish, we show that our results reduce to those of the standard Dirac-Moshinsky oscillator. [ABSTRACT FROM AUTHOR]

Published

2020

3. SU(1,1) solution for the Dunkl–Coulomb problem in two dimensions and its coherent states.

Author

Salazar-Ramírez, M., Ojeda-Guillén, D., Mota, R. D., and Granados, V. D.

Subjects

*DIMENSIONS, *COHERENT states, *MATHEMATICAL symmetry, *LIE algebras, *MATHEMATICAL variables, *STATICS

Abstract

We study the radial part of the Dunkl–Coulomb problem in two dimensions and show that this problem possesses the SU(1,1) symmetry. We introduce two different realizations of the su(1,1) Lie algebra and use the theory of irreducible representations to obtain the energy spectrum and eigenfunctions. For the first algebra realization, we apply the Schrödinger factorization to the radial part of the Dunkl–Coulomb problem to construct the algebra generators. In the second realization, we introduce three operators, one of them proportional to the Hamiltonian of the radial Schrödinger equation. Finally, we use the SU(1,1) Sturmian basis to construct the radial coherent states in a closed form. [ABSTRACT FROM AUTHOR]

Published

2018