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

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

doi:10.1142/S0217732318501122

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

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

Research output: Contribution to journal › Article › peer-review

20 Scopus citations

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.

Original language	English
Article number	1850112
Journal	Modern Physics Letters A
Volume	33
Issue number	20
DOIs	https://doi.org/10.1142/S0217732318501122
State	Published - 28 Jun 2018

Keywords

Algebraic methods
Dunkl operators
Schrödinger factorization
coherent states
tilting transformation

Access to Document

10.1142/S0217732318501122

Cite this

@article{f50b5ded42c84631a1cdb855e301eb50,

title = "SU(1, 1) solution for the Dunkl-Coulomb problem in two dimensions and its coherent states",

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 Schr{\"o}dinger 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 Schr{\"o}dinger equation. Finally, we use the SU(1,1) Sturmian basis to construct the radial coherent states in a closed form.",

keywords = "Algebraic methods, Dunkl operators, Schr{\"o}dinger factorization, coherent states, tilting transformation",

author = "M. Salazar-Ram{\'i}rez and D. Ojeda-Guill{\'e}n and Mota, {R. D.} and Granados, {V. D.}",

note = "Publisher Copyright: {\textcopyright} 2018 World Scientific Publishing Company.",

year = "2018",

month = jun,

day = "28",

doi = "10.1142/S0217732318501122",

language = "Ingl{\'e}s",

volume = "33",

journal = "Modern Physics Letters A",

issn = "0217-7323",

number = "20",

}

TY - JOUR

T1 - SU(1, 1) solution for the Dunkl-Coulomb problem in two dimensions and its coherent states

AU - Salazar-Ramírez, M.

AU - Ojeda-Guillén, D.

AU - Mota, R. D.

AU - Granados, V. D.

PY - 2018/6/28

Y1 - 2018/6/28

N2 - 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.

AB - 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.

KW - Algebraic methods

KW - Dunkl operators

KW - Schrödinger factorization

KW - coherent states

KW - tilting transformation

UR - http://www.scopus.com/inward/record.url?scp=85048827990&partnerID=8YFLogxK

U2 - 10.1142/S0217732318501122

DO - 10.1142/S0217732318501122

M3 - Artículo

SN - 0217-7323

VL - 33

JO - Modern Physics Letters A

JF - Modern Physics Letters A

IS - 20

M1 - 1850112

ER -

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

Abstract

Keywords

Access to Document

Other files and links

Fingerprint

Cite this