非均匀量子等离子体中的非线性波

毛杰健; 杨建荣; 李超英

doi:10.7498/aps.61.020206

摘要

本文探讨具有温度和密度梯度的非均匀量子等离子体系统, 获得了该系统在离子与中子碰撞频率较低情况下的二维非线性流体动力学方程．求得了非均匀量子等离子体中的电势的冲击、爆炸和旋涡解．分析讨论了在致密天体物理环境中静电势的变化, 结果表明电势的冲击波的幅度和爆炸波的宽度,都随密度的增大(即随无维量子参量的减小)而增大, 但随漂移速度的增大(即随密度和温度梯度的增大)而减小; 静电势随时空相位的增大而趋向于稳定值, 系统最后达到稳定的状态．旋涡解表明,旋涡静电势的时空分布呈现稳定的周期性的旋涡流．

关键词:

Abstract

For an inhomogeneous quantum magnetoplasma system with density and temperature gradients, a two-dimensional nonlinear fluid dynamic equation is derived in the case where the collision frequency between ions and neutrals is minor. The shock, explosion and vortex solutions of the potential for this system are obtained. The changes of the potential in the dense astrophysical environment are discussed. It is shown that the strength of the shock and the width of the explosion are both enhanced with the density increasing (equivalently, the normalized quantum parameter decreasing), but with the drift velocity decreasing (equivalently, the density and temperature gradients decreasing); the potential always tends to a stable value with the spatiotemporal phase increasing, and the system approaches finally to a stable state. Besides, the temporal and spatial distributions of the vortex potential display a stable and period vortex street.

Keywords:

作者及机构信息

1.
上饶师范学院物理与电子系, 上饶 334001;

2.
上海交通大学物理系, 上海 200240

基金项目: 江西省自然科学基金(批准号: 2009GZW0026 和 2008GZS0045)和国家自然科学基金(批准号: 10905038)资助的课题.

Authors and contacts

1.
Department of Physics and Electronics, Shangrao Normal University, Shangrao 334001, China;

2.
Department of Physics, Shanghai Jiaotong University, Shanghai 200240, China

Funds: Project supported by the Natural Science Foundation of Jiangxi Provence, China (Grant Nos. 2009GZW0026, 2008GZS0045), and the National Natural Science Foundation of China (Grant No. 10905038).

参考文献

[1]	Jung Y D 2001 Phys. Plasmas 8 3842
[2]	Manfredi G, Haas F 2001 Phys. Rev. B 64 075316
[3]	Kremp D, Bornath T, Bonitz M, Schlanges M 1999 Phys. Rev. E 60 4725
[4]	Shukla P K, Ali S 2005 Phys. Plasmas 12 114502
[5]	Tang X Y, Shukla P K 2007 J. Phys. A: Math. Theor. 40 5921 Tang X Y, Shukla P K 2008 Phys.Plasmas 15 023702
[6]	Haas F 2005 Phys. Plasmas 12 062117
[7]	Haque Q, Mahmood S 2008 Phys. Plasmas 15 034501
[8]	Masood W 2009 Phys. Lett. A 373 1455
[9]	Masood W, Karim S, Shah H A , Siddiq M 2009 Phys. Plasmas 16 042108
[10]	Haque Q, Saleem H 2008 Phys. Plasmas 15 064504
[11]	Garcia L G, Haas F, de Oliveira L P L, Goedert J 2005 Phys.Plasmas 12 012302
[12]	Moslem W M, Ali S, Shukla P K, Tang X Y, Rowlands G 2007 Phys. Plasmas 14 082308
[13]	Yang J R, Tang X Y, Lou S Y 2011 Phys.Plasmas 18 022303

施引文献

[1]	Jung Y D 2001 Phys. Plasmas 8 3842
[2]	Manfredi G, Haas F 2001 Phys. Rev. B 64 075316
[3]	Kremp D, Bornath T, Bonitz M, Schlanges M 1999 Phys. Rev. E 60 4725
[4]	Shukla P K, Ali S 2005 Phys. Plasmas 12 114502
[5]	Tang X Y, Shukla P K 2007 J. Phys. A: Math. Theor. 40 5921 Tang X Y, Shukla P K 2008 Phys.Plasmas 15 023702
[6]	Haas F 2005 Phys. Plasmas 12 062117
[7]	Haque Q, Mahmood S 2008 Phys. Plasmas 15 034501
[8]	Masood W 2009 Phys. Lett. A 373 1455
[9]	Masood W, Karim S, Shah H A , Siddiq M 2009 Phys. Plasmas 16 042108
[10]	Haque Q, Saleem H 2008 Phys. Plasmas 15 064504
[11]	Garcia L G, Haas F, de Oliveira L P L, Goedert J 2005 Phys.Plasmas 12 012302
[12]	Moslem W M, Ali S, Shukla P K, Tang X Y, Rowlands G 2007 Phys. Plasmas 14 082308
[13]	Yang J R, Tang X Y, Lou S Y 2011 Phys.Plasmas 18 022303

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