Regularization of the singular inverse square potential in quantum mechanics with a minimal length

Bouaziz, Djamil; Bawin, M.

doi:10.1103/physreva.76.032112

Cited by 99 publications

(112 citation statements)

References 48 publications

(78 reference statements)

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“…This pathological potential has deserved some attention recently (see for example [9,10] and references therein) although it has been addressed already in 1950 by K. M. Case [11]. The main problem with this potential is that the energy levels are unbounded from below making the bound states unstable.…”

Section: Introductionmentioning

confidence: 99%

On the quantum dynamics of a point particle in conical space

Filgueiras

Moraes

2008

Annals of Physics

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A quantum neutral particle, constrained to move on a conical surface, is used as a toy model to explore bound states due to both a inverse squared distance potential and a δ-function potential, which appear naturally in the model. These pathological potentials are treated with the self-adjoint extension method which yields the correct boundary condition (not necessarily a null wavefunction) at the origin. We show that the usual boundary condition requiring that the wavefunction vanishes at the origin is arbitrary and drastically reduces the number of bound states if used. The situation studied here is closely related to the problem of a dipole moving in conical space.

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Section: Introductionmentioning

confidence: 99%

On the quantum dynamics of a point particle in conical space

Filgueiras

Moraes

2008

Annals of Physics

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“…[4][5][6][7][8][9][10][11][12][13]. The idea of modifying the standard Heisenberg uncertainty relation in such a way that it includes a minimal length has first been proposed in the context of quantum gravity and string theory [14,15].…”

Section: Introductionmentioning

confidence: 99%

Hydrogen atom in momentum space with a minimal length

Bouaziz

Ferkous

2010

Phys. Rev. A

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A momentum representation treatment of the hydrogen atom problem with a generalized uncertainty relation,which leads to a minimal length (∆X i ) min = √ 3β + β ′ , is presented. We show that the distance squared operator can be factorized in the case β ′ = 2β. We analytically solve the s-wave bound-state equation. The leading correction to the energy spectrum caused by the minimal length depends on √ β. An upper bound for the minimal length is found to be about 10 −9fm. * Electronic address: djamilbouaziz@mail.univ-jijel.dz

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“…However, it has been argued that, in relativistic or nonrelativistic quantum mechanics, this elementary length incorporated in the GUP may be viewed as an intrinsic scale characterizing the system under study [8,18]. Consequently, the formalism based on these deformed commutation relations may provide a new model for an effective description of complex systems such as quasiparticles, nuclei, and molecules [8].…”

Section: Introductionmentioning

confidence: 99%

“…Only a few problems have been solved exactly in the formalism of quantum mechanics with a minimal length, such as the Schrödinger equation for the harmonic oscillator [13] and for the singular inverse square potential [18,19]. In the hydrogen atom problem, for instance, the effect of the minimal length is assumed to be too small and studied perturbatively in coordinate space [12,[14][15][16].…”

Section: Introductionmentioning

confidence: 99%

“…In recent years, various topics were studied in this modified version of quantum mechanics, amongst other, we cite, the Schrödinger equation for, the harmonic oscillator potential [7,12,13], the hydrogen atom problem [12,[14][15][16][17], the singular inverse square potential [18,19], the problem of a particle in a gravitational quantum well [20,21]. In relativistic equations, the minimal length was introduced in the Dirac equation, with a constant magnetic field [22,23], with vector and scalar linear potentials [24], for the hydrogen atom potential [25], and the Dirac oscillator [26,27].…”

Section: Introductionmentioning

confidence: 99%

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Pseudoharmonic oscillator in quantum mechanics with a minimal length

Bouaziz

Boukhellout

2014

Mod. Phys. Lett. A

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The pseudoharmonic oscillator potential is studied in non relativistic quantum mechanics with a generalized uncertainty principle characterized by the existence of a minimal length scale, (∆x) min = √ 5β. By using a perturbative approach, we derive an analytical expression of the energy spectrum in the first order of the minimal length parameter β. We investigate the effect of this fundamental length on the vibration-rotation energy levels of diatomic molecules through this potential function interaction. We explicitly show that the minimal length would have some physical importance in studying the spectra of diatomic molecules. * Electronic address: djamilbouaziz@univ-jijel.dz † Electronic address: abdelmalek-boukhellout@univ-jijel.dz

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Regularization of the singular inverse square potential in quantum mechanics with a minimal length

Cited by 99 publications

References 48 publications

On the quantum dynamics of a point particle in conical space

On the quantum dynamics of a point particle in conical space

Hydrogen atom in momentum space with a minimal length

Pseudoharmonic oscillator in quantum mechanics with a minimal length

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