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非对易的思想最初源于对极小尺度的时空坐标的研究, 后来引起了物理学界的广泛关注, 逐渐探讨了在很多领域中的非对易效应. 随着非对易量子力学的建立, 研究一些精确可解模型的非对易效应是非常有意义的. 各类谐振子模型就是其中之一. 但是在坐标与坐标, 动量与动量都是不对易的情况下, 很难得到耦合谐振子能谱的解析解. 本文旨在研究非对易相空间中二维耦合谐振子的量子特性. 首先用不变本征算符方法得到了同时包含多种耦合项的谐振子能谱的解析解. 然后分析非对易参数和耦合参数对非对易能谱的影响. 结果表明, 由于受到非对易参数和耦合参数的影响, 二维耦合谐振子的非对易能谱出现移动, 能级变为非简并的. 这与通常对易空间中二维谐振子能级简并(除基态外)的情况是完全不同的.The ideas of noncommutative space originate from the research on time-space coordinate on an extremely small scale. Subsequently, the noncommutative space has gradually attracted some attention. The researchers started to explore noncommutative effect in some other fields. With the establishment of noncommutative quantum mechanics, it becomes significant to explore the noncommutative effect of exactly solvable models. The kinds of harmonic oscillators are very important and fundamental models in physics. But in noncommutative phase space, coordinate and coordinate are noncommutative, and momentum and momentum are also noncommutative. These results in the difficulty in obtaining the energy spectra of oscillators systems. In this paper the quantum properties of a two-dimensional coupling harmonic oscillator in noncommutative phase space are studied. Firstly, the Hamiltonian of the system is constructed, which includes all possible coupling types, namely, coordinate-coordinate coupling, momentum-momentum coupling, and coordinate-momentum cross-coupling. Secondly, the explicit expression of the noncommutative energy spectrum for the Hamiltonian is obtained by using the invariant eigen-operator method. In this work it is shown explicitly that the changes in the energy levels are related to the noncommutative parameters and coupling parameters. Thirdly, the effects of coupling parameters and non-commutative parameters on the energy spectra are analyzed in detail in the form of graphs. The results show that the energy levels under the influence of non-commutative parameters are non-degenerated. As the values of non-commutation parameters
$ \theta $ and$ \phi $ increase, some energy levels increase and tend to change linearly, and other energy levels first decrease and then increase. If the limit values of the non-commutative parameters are taken as follows:$ \theta \to 0 $ and$ \phi \to 0 $ , then the noncommutative energy spectra will be consistent with the energy spectra of the two-dimensional harmonic oscillator in the commutative space in general. On the other hand, the energy levels will split under the influence of coupling parameters. Moreover, the degree to which the energy levels split can increase as the kinds of couplings in the system increase. It is found that the coordinate coupling parameter$ \eta $ and the momentum coupling parameter$ \sigma $ have the same influence on the energy levels, but the coordinate momentum cross-coupling parameter$ \kappa $ has less influence on the energy levels than$ \eta $ and$ \sigma $ . Overall, the above results are completely different from those of two-dimensional oscillator in the usual commutative space, which is degenerated except for the ground state.-
Keywords:
- coupling harmonic oscillator /
- non-commutative phase space /
- invariant eigen-operator method
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Ju Z Z, Li W B 2013 Coll. Phys. 32 35
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表 1 能级
$ E_{{n_1}, {n_2}}^{(1)} $ 的值(n1+n2 = 2, η= σ = κ = 0)Table 1. Values of
$ E_{{n_1}, {n_2}}^{(1)} $ (n1+n2 = 2, η = σ = κ = 0)$ E_{2, 0}^{\left( 1 \right)} $ $ E_{1, 1}^{\left( 1 \right)} $ $ E_{0, 2}^{\left( 1 \right)} $ θ = ϕ = 0 3 3 3 θ = 0.1, ϕ = 0 3.1025 3.0025 2.9025 θ = 0, ϕ = 0.1 3.1025 3.0025 2.9025 θ = 0.1, ϕ = 0.1 3.2 3.0 2.8 表 2 能级
$ E_{{n_1}, {n_2}}^{(2)} $ 的值(n1+n2 = 2, θ = ϕ = 0)Table 2. Values of
$ E_{{n_1}, {n_2}}^{(2)} $ (n1+n2 = 2, θ = ϕ = 0)$ E_{2, 0}^{(2)} $ $ E_{1, 1}^{\left( 2 \right)} $ $ E_{0, 2}^{\left( 2 \right)} $ η = 0.1, σ = 0, κ = 0 3.09762 2.99749 2.89737 η = 0, σ = 0.1, κ = 0 3.09762 2.99749 2.89737 η = 0, σ = 0.1, κ = 0.1 3.0000 2.9798 2.95959 η = 0.1, σ = 0.1, κ = 0 3.2 3.0 2.8 η = 0.1, σ = 0, κ = 0.1 3.05913 2.97825 2.82038 η = 0, σ = 0.1, κ = 0.1 3.05913 2.97825 2.82038 η = 0.1, σ = 0.1, κ = 0.1 3.16333 2.98167 2.80000 -
[1] Snyder H S 1947 Phys. Rev. 72 68Google Scholar
[2] Seiberg N, Witten E 1999 J. High Energy Phys. 3 32Google Scholar
[3] Doplicher S, Fredenhagen K, Roberts J E 1994 Phys. Lett. B. 331 39Google Scholar
[4] Zupnik B M 2007 Class. Quantum Grav. 24 15Google Scholar
[5] Polychronakos A P 2001 J. High Energy Phys. 6 70Google Scholar
[6] Bolonek K, Kosinski P 2002 Phys. Lett. B. 547 51Google Scholar
[7] Gamboa J, Loewe M, Rojas J C 2001 Phys. Rev. D. 64 067901Google Scholar
[8] Nair V P, Polychronakos A P 2001 Phys. Lett. B. 505 267Google Scholar
[9] Falomir H, Pisani P A G, Vegaf, Cárcamo D, Méndez F, Loewe M 2016 J. Phys. A: Math. Theor. 49 055202Google Scholar
[10] Kupriyanov V G 2013 J. Phys. A: Math. Theor. 46 245303Google Scholar
[11] Sinhad D, Giri P R 2011 Mod. Phys. Lett. A. 26 2213Google Scholar
[12] Wu H, Fan H Y 2008 Commun. Theor. Phys. 50 1348Google Scholar
[13] Fan H Y, Li C 2004 Phys. Lett. A. 321 75Google Scholar
[14] Fan H Y, Xu X F, Li C 2004 Commun. Theor. Phys. 42 824Google Scholar
[15] 任益充, 范洪义 2013 62 156301Google Scholar
Ren Y C, Fan H Y 2013 Acta Phys. Sin. 62 156301Google Scholar
[16] 张科, 范承玉, 范洪义 2018 67 170301Google Scholar
Zhang K, Fan C Y, Fan H Y 2018 Acta Phys. Sin. 67 170301Google Scholar
[17] Fan H Y, Wu Z 2018 Chin. Phys. B. 27 080301Google Scholar
[18] 吴泽, 范洪义 2019 68 220301Google Scholar
Fan H Y, Wu Z 2019 Acta Phys. Sin. 68 220301Google Scholar
[19] Lin Q, Fan H Y 2018 Journal of University of Science and Technology of China 48 643
[20] Lin B S, Heng T Y 2011 Chin. Phys. Lett. 28 070303Google Scholar
[21] 琚泽志, 李文波 2013 大学物理 32 35
Ju Z Z, Li W B 2013 Coll. Phys. 32 35
[22] 张秀兰, 刘恒, 余海军 2011 60 040303Google Scholar
Zhang X L, Liu H, Yu H J 2011 Acta Phys. Sin. 60 040303Google Scholar
[23] Han D, Kim Y, Noz M 1995 J. Math. Phys. 36 3940Google Scholar
[24] Han D, Kim Y, Noz M 1999 Am. J. Phys. 67 61Google Scholar
[25] Kim Y, Noz M 2007 J. Opt. B Quant. Semiclass. Opt. 7 S458Google Scholar
[26] Jellal A, Kinani E, Schreiber M 2005 Int. J. Mod. Phys. A 20 7Google Scholar
[27] Lin B S, Jing S C, Heng T H 2008 Mod. Phys. Lett. A. 23 445Google Scholar
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