Harmonic oscillator with minimal length uncertainty relations and ladder operators

被引:70
|
作者
Dadic, I [1 ]
Jonke, L [1 ]
Meljanac, S [1 ]
机构
[1] Rudjer Boskovic Inst, Div Theoret Phys, HR-10002 Zagreb, Croatia
来源
PHYSICAL REVIEW D | 2003年 / 67卷 / 08期
关键词
D O I
10.1103/PhysRevD.67.087701
中图分类号
P1 [天文学];
学科分类号
0704 ;
摘要
We construct creation and annihilation operators for deformed harmonic oscillators with minimal length uncertainty relations. We discuss a possible generalization to a large class of deformations of canonical commutation relations. We also discuss the dynamical symmetry of a noncommutative harmonic oscillator.
引用
收藏
页数:4
相关论文
共 50 条
  • [1] Exact solution of the harmonic oscillator in arbitrary dimensions with minimal length uncertainty relations
    Chang, LN
    Minic, D
    Okamura, N
    Takeuchi, T
    [J]. PHYSICAL REVIEW D, 2002, 65 (12)
  • [2] HYPERVIRIAL THEOREM AND LADDER OPERATORS - RECURRENCE RELATIONS FOR HARMONIC-OSCILLATOR INTEGRALS
    MORALES, J
    PALMA, A
    SANDOVAL, L
    [J]. INTERNATIONAL JOURNAL OF QUANTUM CHEMISTRY, 1986, 29 (02) : 211 - 219
  • [3] Thermodynamic properties and algebraic solution of the N-dimensional harmonic oscillator with minimal length uncertainty relations
    Dossa, Finagnon A.
    [J]. PHYSICA SCRIPTA, 2021, 96 (10)
  • [4] Deformed ladder operators for the generalized one- and two-mode squeezed harmonic oscillator in the presence of a minimal length
    F. A. Dossa
    G. Y. H. Avossevou
    [J]. Theoretical and Mathematical Physics, 2022, 211 : 532 - 544
  • [5] DEFORMED LADDER OPERATORS FOR THE GENERALIZED ONE- AND TWO-MODE SQUEEZED HARMONIC OSCILLATOR IN THE PRESENCE OF A MINIMAL LENGTH
    Dossa, F. A.
    Avossevou, G. Y. H.
    [J]. THEORETICAL AND MATHEMATICAL PHYSICS, 2022, 211 (01) : 532 - 544
  • [6] Generalized ladder operators for the perturbed harmonic oscillator
    Bosso, Pasquale
    Das, Saurya
    [J]. ANNALS OF PHYSICS, 2018, 396 : 254 - 265
  • [7] LADDER OPERATORS FROM OSTROGRADSKY VARIABLES FOR HARMONIC OSCILLATOR
    HAYES, CF
    [J]. AMERICAN JOURNAL OF PHYSICS, 1969, 37 (08) : 837 - &
  • [8] Thermodynamics of harmonic oscillator with minimal length
    Koffa, D. J.
    Ibrahim, T. T.
    Omonile, J. F.
    Oladimeji, E. O.
    Gwani, M. M.
    Edogbanya, H. O.
    [J]. PHYSICA SCRIPTA, 2024, 99 (05)
  • [9] Massive fermions interacting via a harmonic oscillator in the presence of a minimal length uncertainty relation
    Falaye, B. J.
    Dong, Shi-Hai
    Oyewumi, K. J.
    Haiwi, K. F.
    Ikhdair, S. M.
    [J]. INTERNATIONAL JOURNAL OF MODERN PHYSICS E, 2015, 24 (11):
  • [10] Theoretical Study of Isotropic Harmonic Oscillator Using Ladder Operators
    Nilesh, Barde
    Pranav, Bardapurkar
    Suhas, Desai
    Kamalakar, Jadhav
    [J]. AFRICAN REVIEW OF PHYSICS, 2015, 10 : 153 - 156
12345