流向磁场抑制Kelvin-Helmholtz不稳定性机理研究

石启陈; 赵志杰; 张焕好; 陈志华; 郑纯

doi:10.7498/aps.70.20202024

摘要

采用CTU + CT (corner transport upwind + constrained transport)算法对磁流体动力学方程组进行求解, 分别对有无磁场控制条件下开尔文-赫姆霍兹(Kelvin-Helmholtz, KH)不稳定性的演化过程进行数值模拟. 数值结果分析了磁场($ {M_{\rm{A}}} = 3.33$)对混合层流场涡量和压力演化的影响, 并与经典流体力学情况进行对比; 另外, 还从磁压力和磁张力分布情况对磁场抑制KH不稳定性的机理进行分析. 结果表明, 外加磁场对混合层结构的演变产生很大的影响, 其中, 磁压力使涡量在界面处沉积, 而磁张力能够产生一个与涡旋转方向相反的力矩, 从而对大涡结构起到拉伸破坏作用, 最终抑制了涡的卷起. 此外, 当流动发展到一定阶段, 在磁压力、磁张力以及压力场的共同作用下, 界面在曲率最大位置处会发生分离, 最终形成“鱼钩”状涡结构.

关键词:

Abstract

The evolution of the Kelvin-Helmholtz (KH) instability in the presence of classical hydrodynamics and magneto-hydro-dynamics is investigated numerically by using the magneto-hydro-dynamic (MHD) equations. The MHD equations are solved with the corner transport upwind plus constrained transport algorithm that guarantees the divergence-free constraint in the magnetic field. The numerical results are used to analyze the effects of magnetic field (${M_{\rm{A}}} = 3.33$) on the vorticity and pressure evolution of mixing layer, and also compared with those in the hydrodynamics situation. Moreover, the mechanism of weakening the effect of magnetic field on the KH instability is revealed from the perspectives of the magnetic pressure and the magnetic tension. The results show that the external magnetic field has a great influence on the flow structure of the mixing layer. Specifically, the magnetic pressure has a major effect in the vorticity deposition on the interface, whereas the magnetic tension generates a torque to counter the scrolling of vortex. As a result, the large vortex structure is stretched and destroyed, and finally restrains the vortex rolling-up. In addition, with the development of mixing layer, the interface will separate at the points of maximum curvature under the joint effect of the magnetic pressure, the magnetic tension and the pressure field, and finally form a fishhook-like vortex structure.

Keywords:

作者及机构信息

1.
南京理工大学, 瞬态物理国家重点实验室, 南京　210094

2.
南京理工大学机械工程学院, 南京　210094

通信作者: 张焕好, zhanghuanhao@njust.edu.cn

基金项目: 国家自然科学基金(批准号: 12072162)、中央高校基本科研业务费专项资金(批准号: 30919011260)和江苏省研究生科研与实践创新计划项目(批准号: KYCX20_0252)资助的课题

Authors and contacts

1.
National Key Laboratory of Transient Physics, Nanjing University of Science & Technology, Nanjing 210094, China

2.
School of Mechanical Engineering, Nanjing University of Science & Technology, Nanjing 210094, China

Corresponding author: Zhang Huan-Hao, zhanghuanhao@njust.edu.cn

Funds: Project supported by the National Natural Science Foundation of China (Grant No. 12072162), the Fundamental Research Fund for the Central Universities, China (Grant No. 30919011260), and the Postgraduate Research & Practice Innovation Program of Jiangsu Province, China (Grant No. KYCX20_0252)

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参考文献

[1]	Rahmani M, Seymour B, Lawrence G 2014 Environ. Fluid Mech. 14 1275 Google Scholar
[2]	Ryutova M, Berger T, Frank Z, Tarbell T, Title A 2010 Sol. Phys. 267 75 Google Scholar
[3]	Zhelyazkov I, Zaqarashvili T V, Ofman L, Chandra R 2018 Adv. Space Res. 61 628 Google Scholar
[4]	Ismayilli R F, Dzhalilov N S, Shergelashvili B M, Poedts S, Pirguliyev M S 2018 Phys. Plasmas 25 062903 Google Scholar
[5]	Zhelyazkov I, Chandra R, Srivastava A K, Mishonov T 2015 Astrophys. Space Sci. 356 231 Google Scholar
[6]	Wu C C 1986 J. Geophys. Res. Space Phys. 91 3042 Google Scholar
[7]	Hasegawa H, Fujimoto M, Takagi K, Saito Y, Mukai T, Rème H 2006 J. Geophys. Res. Space Phys. 111 1 Google Scholar
[8]	Leroy M H J, Keppens R 2016 Meeting of the French Society of Astronomy & Astrophysics Lyon, France, June 14–17, 2016 p107
[9]	Ho C M, Huerre P 1984 Annu. Rev. Fluid Mech. 16 365 Google Scholar
[10]	Gratton F T, Gnavi G, Farrugia C J, Bender L 2004 Braz. J. Phys. 34 1804 Google Scholar
[11]	Zhao K G, Wang L F, Ye W H, Wu J F, Li Y J 2014 Chin. Phys. Lett. 31 030401 Google Scholar
[12]	Leep L J, Button J C, Burr R F 1993 AIAA J. 31 2039 Google Scholar
[13]	Brüggen M, Hillebrandt W 2001 Mon. Not. R. Astron. Soc. 323 56 Google Scholar
[14]	Keppens R, Toth G, Westermann R H J, Goedbloed J P 1999 J. Plasma Phys. 61 1 Google Scholar
[15]	Sharma R C, Srivastava K M 1970 Can. J. Phys. 48 2083 Google Scholar
[16]	Sharma R C, Srivastava K M 1968 Aust. J. Phys. 21 917 Google Scholar
[17]	Jeong H, Ryu D, Jones T W, Frank A 2000 Astrophys. J. 529 536 Google Scholar
[18]	Tian C L, Chen Y 2016 Astrophys. J. 824 60 Google Scholar
[19]	Liu Y, Chen Z H, Zhang H H, Lin Z Y 2018 Phys. Fluids 30 044102 Google Scholar
[20]	Praturi D S, Girimaji S S 2019 Phys. Fluids 31 024108 Google Scholar
[21]	Lin Z Y, Zhang H H, Chen Z H, Liu Y, Hong Y 2017 Int. J. Comut. Fluid Dyn. 31 21 Google Scholar
[22]	林震亚, 张焕好, 陈志华, 刘迎 2017 爆炸与冲击 37 748 Google Scholar Lin Z Y, Zhang H H, Chen Z H, Liu Y 2017 Explosion and Shock Waves 37 748 Google Scholar
[23]	Bogdanoff D W 1983 AIAA J. 21 926 Google Scholar
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[25]	沙莎, 张焕好, 陈志华, 郑纯, 吴威涛, 石启陈 2020 物理学报 69 184701 Google Scholar Sha S, Zhang H H, Chen Z H, Chun C, Wu W T, Shi Q C 2020 Acta Phys. Sin. 69 184701 Google Scholar
[26]	Karimi M, Girimaji S S 2016 Phys. Rev. E 93 041102 Google Scholar
[27]	Karimabadi H, Roytershteyn V, Wan M, Matthaeus W H, Daughton W, Wu P, Shay M, Loring B, Borovsky J, Leonardis E 2013 Phys. Plasmas 20 763 Google Scholar
[28]	Patnaik P C, Sherman F S, Corcos G M 1976 J. Fluid Mech. 73 215 Google Scholar

施引文献

图 1 计算模型

Fig. 1. Schematic of computational model.

下载: 全尺寸图片幻灯片

图 2 无磁场情况下, 本文数值结果与文献结果的对比　(a)本文数值结果; (b)文献数值结果^[18]

Fig. 2. Comparison of the present numerical simulation results with that of literature: (a) Numerical results of this paper; (b) numerical results of literature^[18].

下载: 全尺寸图片幻灯片

图 3 不同磁场强度混合层失稳过程的涡量分布　(a)$\tau = $$ 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$

Fig. 3. Snapshots of the vorticity field at different instants: (a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$.

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图 4 经典流体(HD)混合层失稳过程的涡量分布　(a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f)$\tau = 276$

Fig. 4. Vorticity distribution during the instability process of the classical fluid mixing layer: (a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f)$\tau = 276$.

下载: 全尺寸图片幻灯片

图 5 经典流体(HD)混合层失稳过程的压力分布　(a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f)$\tau = 276$

Fig. 5. Pressure distribution during the instability process of the classical fluid mixing layer: (a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f)$\tau = 276$.

下载: 全尺寸图片幻灯片

图 6 磁流体(MHD)混合层失稳过程的涡量分布　(a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f) $\tau = 197$

Fig. 6. Vorticity distribution of the MHD mixing layer: (a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f) $\tau = 197$.

下载: 全尺寸图片幻灯片

图 7 磁流体(MHD)混合层失稳过程的压力分布　(a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f) $\tau = 197$

Fig. 7. Pressure distribution of the MHD mixing layer: (a)$\tau = 30$; (b)$\tau = 51$; (c)$\tau = 73$; (d)$\tau = 119$; (e)$\tau = 141$; (f) $\tau = 197$.

下载: 全尺寸图片幻灯片

图 8 HD和MHD情况下, 纵向总动能随时间变化

Fig. 8. The y-component of the total kinetic energy for the HD and MHD situations.

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图 9 HD和MHD情况下涡量厚度(a)和环量(b)随时间的变化

Fig. 9. Temporal evolutions of the vorticity thickness (a) and circulation (b) in the case of HD and MHD.

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图 10 混合层发展过程中涡量及磁感应线分布　(a)$\tau = 73$; (b)$\tau = 97$; (c)$\tau = 119$; (d)$\tau = 141$

Fig. 10. Distribution of the vorticity and magnetic induction line at different times: (a)$\tau = 73$; (b)$\tau = 97$; (c)$\tau = 119$; (d)$\tau = 141$.

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图 11 MHD情况, 平均磁场强度随时间的变化

Fig. 11. Change of average magnetic field intensity with time for the MHD situation.

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图 12 磁压力分布(上图: 纵向磁压力; 下图: 横向磁压力)　(a)$\tau = 51$; (b)$\tau = 119$

Fig. 12. Magnetic pressure distribution (upper: longitudinal magnetic pressure; lower: transverse magnetic pressure): (a)$\tau = 51$; (b)$\tau = 119$.

下载: 全尺寸图片幻灯片

图 13 界面上磁压力的方向　(a)$\tau = 51$; (b)$\tau = 119$

Fig. 13. Directions of magnetic pressure on the interfaces: (a)$\tau = 51$; (b)$\tau = 119$.

下载: 全尺寸图片幻灯片

图 14 平均涡量随时间的变化

Fig. 14. Variation of the mean vorticity over time.

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图 15 磁张力分布(上图: 纵向磁张力; 下图: 横向磁张力)　(a) $\tau = 51$; (b) $\tau = 119$

Fig. 15. Magnetic tension distribution (upper: longitudinal magnetic tension; lower: transverse magnetic tension): (a) $\tau = 51$; (b)$\tau = 119$.

下载: 全尺寸图片幻灯片

图 16 涡量和磁张力矢量分布图　(a) $\tau = 51$; (b) $\tau = $$ 119$

Fig. 16. Vorticity and magnetic tension vector distribution: (a) $\tau = 51$; (b) $\tau = 119$.

下载: 全尺寸图片幻灯片

[1]	Rahmani M, Seymour B, Lawrence G 2014 Environ. Fluid Mech. 14 1275 Google Scholar
[2]	Ryutova M, Berger T, Frank Z, Tarbell T, Title A 2010 Sol. Phys. 267 75 Google Scholar
[3]	Zhelyazkov I, Zaqarashvili T V, Ofman L, Chandra R 2018 Adv. Space Res. 61 628 Google Scholar
[4]	Ismayilli R F, Dzhalilov N S, Shergelashvili B M, Poedts S, Pirguliyev M S 2018 Phys. Plasmas 25 062903 Google Scholar
[5]	Zhelyazkov I, Chandra R, Srivastava A K, Mishonov T 2015 Astrophys. Space Sci. 356 231 Google Scholar
[6]	Wu C C 1986 J. Geophys. Res. Space Phys. 91 3042 Google Scholar
[7]	Hasegawa H, Fujimoto M, Takagi K, Saito Y, Mukai T, Rème H 2006 J. Geophys. Res. Space Phys. 111 1 Google Scholar
[8]	Leroy M H J, Keppens R 2016 Meeting of the French Society of Astronomy & Astrophysics Lyon, France, June 14–17, 2016 p107
[9]	Ho C M, Huerre P 1984 Annu. Rev. Fluid Mech. 16 365 Google Scholar
[10]	Gratton F T, Gnavi G, Farrugia C J, Bender L 2004 Braz. J. Phys. 34 1804 Google Scholar
[11]	Zhao K G, Wang L F, Ye W H, Wu J F, Li Y J 2014 Chin. Phys. Lett. 31 030401 Google Scholar
[12]	Leep L J, Button J C, Burr R F 1993 AIAA J. 31 2039 Google Scholar
[13]	Brüggen M, Hillebrandt W 2001 Mon. Not. R. Astron. Soc. 323 56 Google Scholar
[14]	Keppens R, Toth G, Westermann R H J, Goedbloed J P 1999 J. Plasma Phys. 61 1 Google Scholar
[15]	Sharma R C, Srivastava K M 1970 Can. J. Phys. 48 2083 Google Scholar
[16]	Sharma R C, Srivastava K M 1968 Aust. J. Phys. 21 917 Google Scholar
[17]	Jeong H, Ryu D, Jones T W, Frank A 2000 Astrophys. J. 529 536 Google Scholar
[18]	Tian C L, Chen Y 2016 Astrophys. J. 824 60 Google Scholar
[19]	Liu Y, Chen Z H, Zhang H H, Lin Z Y 2018 Phys. Fluids 30 044102 Google Scholar
[20]	Praturi D S, Girimaji S S 2019 Phys. Fluids 31 024108 Google Scholar
[21]	Lin Z Y, Zhang H H, Chen Z H, Liu Y, Hong Y 2017 Int. J. Comut. Fluid Dyn. 31 21 Google Scholar
[22]	林震亚, 张焕好, 陈志华, 刘迎 2017 爆炸与冲击 37 748 Google Scholar Lin Z Y, Zhang H H, Chen Z H, Liu Y 2017 Explosion and Shock Waves 37 748 Google Scholar
[23]	Bogdanoff D W 1983 AIAA J. 21 926 Google Scholar
[24]	董国丹, 郭则庆, 秦建华, 张焕好, 姜孝海, 陈志华, 沙莎 2019 物理学报 68 165201 Google Scholar Dong G D, Guo Z Q, Qin J H, Zhang H H, Jiang X H, Chen Z H, Sha S 2019 Acta Phys. Sin. 68 165201 Google Scholar
[25]	沙莎, 张焕好, 陈志华, 郑纯, 吴威涛, 石启陈 2020 物理学报 69 184701 Google Scholar Sha S, Zhang H H, Chen Z H, Chun C, Wu W T, Shi Q C 2020 Acta Phys. Sin. 69 184701 Google Scholar
[26]	Karimi M, Girimaji S S 2016 Phys. Rev. E 93 041102 Google Scholar
[27]	Karimabadi H, Roytershteyn V, Wan M, Matthaeus W H, Daughton W, Wu P, Shay M, Loring B, Borovsky J, Leonardis E 2013 Phys. Plasmas 20 763 Google Scholar
[28]	Patnaik P C, Sherman F S, Corcos G M 1976 J. Fluid Mech. 73 215 Google Scholar

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流向磁场抑制Kelvin-Helmholtz不稳定性机理研究