Numerical investigation of electrohydrodynamic solid-liquid phase change in square enclosure

He Kun; Guo Xiu-Ya; Zhang Xiao-Ying; Wang Lei

doi:10.7498/aps.70.20202127

Abstract

Melting of the dielectric phase change material inside a closed square enclosure is numerically investigated. The fully coupled equations including Navier-Stokes equations, Poisson's equation, charge conservation equation and the energy equation are solved using the lattice Boltzmann method (LBM). Strong charge injection from a high temperature vertical electrode is considered and the basic characteristics of fluid flow, charge transport and heat transfer in solid-liquid phase change process under the coupling of Coulomb force and buoyancy force are systematically studied. Emphasis is put on analysing the influence of multiple non-dimensional parameters, including electric Rayleigh number T, Stefan number $Ste$, mobility number M, and Prandtl number $Pr$ on electrohydrodynamic (EHD) solid-liquid phase change. The numerical results show that comparing with the melting process driven by buoyancy force, the applied electric field will not only change the flow structure in liquid region and the evolution of the liquid-solid interface, but also increase the heat transfer efficiency of dielectric phase change material and thus enhance the solid-liquid phase change process. In particular, we find that this phenomenon becomes more pronounced when T is larger. Further, the dimensionless parameter $\varPhi$ is introduced to characterize the effect of EHD enhanced solid-liquid phase change, and the results indicate that the effect of EHD enhancement solid-liquid phase change is weakened with the increase of Stefan number $Ste$, However the change of $Ste$ does not make much difference in EHD enhancement solid-liquid phase change for a sufficiently high electric Rayleigh number T, and it is attributed to the fully developed convection cells at a very early stage of the melting process. Moreover, it is found that the effect of EHD enhancement solid-liquid phase change is negatively related to the mobility number M and that the effect of Prandtl number $Pr$ on the EHD enhancement solid-liquid phase change largely depends on the mobility number M, which is due to the simultaneous influence of electric field force and buoyancy force. In general, the electric field has a significant influence on the melting process of dielectric phase change material, especially at high T,$Pr$ and low $Ste$, M. And quantitatively, in all tested cases, a maximum melting time saves about 86.6% at $T=1000$, $Ra=10000$, $M=3$, $Pr=20$, and $Ste=0.1$.

Keywords:

Authors and contacts

1.
School of Mathematics and Physics, China University of Geosciences, Wuhan 430074, China
2.
Centre for Mathematical Sciences, China University of Geosciences, Wuhan 430074, China
3.
School of Mathematics and Computer Science, Wuhan Textile University, Wuhan 430074, China
4.
School of Energy and Power Engineering, Huazhong University of Science and Technology, Wuhan 430074, China

Corresponding author: Wang Lei, wangleir1989@126.com

Funds: Project supported by the National Natural Science Foundation of China (Grant No. 12002320)

FullText HTML : translate this paragraph

References

[1]	Luo X, Wang J H, Dooner M, Clarke J 2015 Appl. Energy 137 511 Google Scholar
[2]	Chen H S, Cong T N, Yang W, Tan C Q, Li Y L, Ding Y L 2009 Prog. Nat. Sci. 19 291 Google Scholar
[3]	霍宇涛 2018 博士学位论文 (徐州: 中国矿业大学) Huo Y T 2018 Ph. D. Dissertation (Xuzhou: China University of Mining and Technology) (in Chinese)
[4]	Ren Q L, Meng F L, Guo P H 2018 Int. J. Heat Mass Transfer 121 1214 Google Scholar
[5]	赵耀 2018 博士学位论文 (上海: 上海交通大学) Zhao Y 2018 Ph. D. Dissertation (Shanghai: Shanghai Jiao Tong University) (in Chinese)
[6]	Sharma A, Tyagi V V, Chen C R, Buddhi D 2009 Renewable Sustainable Energy Rev. 13 318 Google Scholar
[7]	Agyenim F, Hewitt N, Eames P, Smyth M 2010 Renewable Sustainable Energy Rev. 14 615 Google Scholar
[8]	Ren Q L 2019 Energy Convers. Manage. 180 784 Google Scholar
[9]	Stritih U 2004 Int. J. Heat Mass Transfer 47 2841 Google Scholar
[10]	Lacroix M, Benmadda M 1997 Numer. Heat Tranfer, Part A 31 71 Google Scholar
[11]	Ji C Z, Qin Z, Low Z H, Dubey S, Choo F H, Duan F 2018 Appl. Therm. Eng. 129 269 Google Scholar
[12]	Khodadadi J M, Hosseinizadeh S F 2007 Int. Commun. Heat Mass Transfer 34 534 Google Scholar
[13]	Feng Y C, Li H X, Li L X, Bu L, Wang T 2015 Int. J. Heat Mass Transfer 81 415 Google Scholar
[14]	Xiao X, Zhang P, Li M 2014 Int. J. Therm. Sci. 81 94 Google Scholar
[15]	张涛, 余建祖 2007 制冷学报 6 13 Google Scholar Zhang T, Yu J Z 2007 J. Refrigeration 6 13 Google Scholar
[16]	Fan L W, Zhu Z Q, Zeng Y, Ding Q, Liu M J 2016 Int. J. Heat Mass Transfer 95 1057 Google Scholar
[17]	Fan L W, Zhu Z Q, Liu M J, Xu C L, Zeng Y, Lu H, Tao Y Z 2016 J. Heat Transfer-Trans. ASME 138 122402 Google Scholar
[18]	Oh Y K, Park S H, Cha K O 2001 KSME Int. J. 15 1882 Google Scholar
[19]	Oh Y K, Park S H, Cho Y I 2002 Int. J. Heat Mass Transfer 45 4631 Google Scholar
[20]	Nakhla D, Sadek H, Cotton J S 2015 Int. J. Heat Mass Transfer 81 695 Google Scholar
[21]	Rashidi S, Bafekr H, Masoodi R, Languri M E 2017 J. Electrostat. 8 1 Google Scholar
[22]	Atten P, Mc Cluskey F, Pérez A 1988 IEEE Transactions on Electrical Insulation 23 659 Google Scholar
[23]	Traoré P, Pérez A T, Koulova D, Romat H 2010 J. Fluid Mech. 658 279 Google Scholar
[24]	Wu J, Traoré P, Zhang M, Pérez A T, Vázquez P A 2016 Int. J. Heat Mass Transfer 92 139 Google Scholar
[25]	陈凤, 彭耀, 宋耀祖, 陈民 2007 工程热物理学报 4 679 Google Scholar Chen F, Peng Y, Song Y Z, Chen M 2007 J. Eng. Therm. 4 679 Google Scholar
[26]	Gao M, Cheng P, Quan X 2013 Int. J. Heat Mass Transfer 67 984 Google Scholar
[27]	Sadek H, Ching C Y, Cotton J 2010 Int. J. Heat Mass Transfer 53 3721 Google Scholar
[28]	陈春天, 杨嘉祥, 张颖, 李静 2004 工程热物理学报 2 284 Google Scholar Chen C T, Yang J X, Zhang Y, Li J 2004 J. Eng. Therm. 2 284 Google Scholar
[29]	李典, 王太, 陈烁, 谢英柏, 刘春涛 2020 工程热物理学报 41 2752 Li D, Wang T, Chen L, Xie Y B, Liu C T 2020 J. Eng. Therm. 41 2752
[30]	危卫, 张云伟, 顾兆林 2013 科学通报 58 197 Google Scholar Wei W, Zhang Y W, Gu Z L 2013 Chin. Sci. Bull. 58 197 Google Scholar
[31]	Nakhla D, Thompson E, Lacroix B, Cotton J S 2018 J. Electrostat. 92 31 Google Scholar
[32]	Luo K, Pérez A T, Wu J, Yi H L, Tan H P 2019 Phys. Rev. E 100 013306 Google Scholar
[33]	卢才磊 2020 硕士学位论文 (哈尔滨: 哈尔滨工业大学) Lu C L 2020 M. D. Thesis (Haerbin: Harbin Institute of Technology) (in Chinese)
[34]	Selvakumar R D, Liu Q, Luo K, Traoré P, Wu J 2021 Int. J. Multiphase Flow 136 103550 Google Scholar
[35]	Nakhla D, Cotton J S 2021 Int. J. Heat Mass Transfer 167 120828 Google Scholar
[36]	Luo K, Wu J, Pérez A T, Yi H L, Tan H P 2019 Phys. Rev. Fluids 4 083702 Google Scholar
[37]	Huang R Z, Wu H Y 2015 J. Comput. Phys. 294 346 Google Scholar
[38]	罗康 2017 博士学位论文 (哈尔滨: 哈尔滨工业大学) Luo K 2017 Ph. D. Dissertation (Haerbin: Harbin Institute of Technology) (in Chinese)
[39]	Chen S, Doolen G D 1998 Annu. Rev. Fluid Mech. 30 329 Google Scholar
[40]	Wang L, Zhao Y, Yang X G, Shi B C, Chai Z H 2019 Appl. Math. Model. 71 31 Google Scholar
[41]	黄昌盛, 张文欢, 侯志敏, 陈俊辉, 李明晶, 何南忠, 施保昌 2011 科学通报 56 2434 Google Scholar Huang C S, Zhang W H, Hou Z M, Chen J H, Li M J, He N Z, Shi B C 2011 Chin. Sci. Bull. 56 2434 Google Scholar
[42]	李洋, 苏婷, 梁宏, 徐江荣 2018 物理学报 67 224701 Google Scholar Li Y, Su T, Liang H, Xu J R 2018 Acta Phys. Sin. 67 224701 Google Scholar
[43]	梁宏 2015 博士学位论文 (武汉: 华中科技大学) Liang H 2015 Ph. D. Dissertation (Wuhan: Huazhong University of Science and Technology) (in Chinese)
[44]	李庆, 余悦, 唐诗 2020 科学通报 65 1677 Google Scholar Li Q, Yu Y, Tang S 2020 Chin. Sci. Bull. 65 1677 Google Scholar
[45]	朱炼华, 郭照立 2015 计算物理 32 20 Google Scholar Zhu L H, Guo Z L 2015 Chin. J. Comput. Phys. 32 20 Google Scholar
[46]	刘高洁, 郭照立, 施保昌 2016 物理学报 65 014702 Google Scholar Liu G J, Guo Z L, Shi B C 2016 Acta Phys. Sin. 65 014702 Google Scholar
[47]	吴健, 张蒙齐, 田方宝 2018 力学学报 50 1458 Google Scholar Wu J, Zhang M Q, Tian F B 2018 Chin. J. Theor. Appl. Mech. 50 1458 Google Scholar
[48]	Luo K, Wu J, Yi H L, Tan H P 2016 Phys. Rev. E 93 023309 Google Scholar
[49]	Wang L, Wei Z C, Li T F, Chai Z H, Shi B C 2021 Appl. Math. Model 95 361 Google Scholar
[50]	Guo Z L, Shi B C, Wang N C 2000 J. Comput. Phys. 165 288 Google Scholar
[51]	Guo Z L, Zheng C G, Shi B C 2002 Phys. Rev. E 65 046308 Google Scholar
[52]	Chai Z H, Shi B C 2008 Appl. Math. Model. 32 2050 Google Scholar
[53]	Lu J H, Lei H Y, Dai C S 2019 Int. J. Therm. Sci. 135 17 Google Scholar
[54]	Huang R Z, Wu H Y 2016 J. Comput. Phys. 315 65 Google Scholar
[55]	Guo Z L, Zheng C G, Shi B C 2002 Phys. Fluids 14 2007 Google Scholar
[56]	Huang R Z, Wu H Y, Cheng P 2013 Int. J. Heat Mass Transfer 59 295 Google Scholar

Cited By

图 1 物理模型示意图

Figure 1. Schematic diagram of the physical model.

DownLoad: Full-Size Img PowerPoint

图 2 液体体积分数$f_{\rm l}$和热壁面平均努塞尔数$Nu_{\rm av}$与Huang等^[56]的结果对比

Figure 2. A comparison of the present average Nusselt number and liquid fraction with previous study^[56].

DownLoad: Full-Size Img PowerPoint

图 3 电荷密度q和水平方向电场强度$E_x$与解析解^[48]对比

Figure 3. A comparison of the charge density and horizontal electric field with analytical solutions^[48].

DownLoad: Full-Size Img PowerPoint

图 4 PCM熔化过程中(a)液体体积分数$f_{\rm l}$和(b)液相最大速度$V_{\rm max}$随时间的变化趋势. 图中点A, B, C和D分别对应时刻$Fo=0.63$, $1.90$, $2.90$和$4.16$

Figure 4. Time evolutions of (a) the liquid fraction and (b) the maximum fluid velocity. Points A, B, C and D correspond to the dimensionless time $Fo=0.36$, $1.90$, $2.90$ and $4.16$, respectively.

DownLoad: Full-Size Img PowerPoint

图 5 电场力驱动下PCM熔化到不同时刻电荷密度、流场以及相界面分布(上)和浮升力驱动下PCM熔化到不同时刻温度、流场以及相界面分布(下)　(a)$Fo=0.63$; (b)$Fo=1.90$; (c)$Fo=2.90$; (d)$Fo=4.16$

Figure 5. Distributions of charge density (temperature), fluid field and liquid-solid interface of PCM at four representative time of (a)$Fo=0.63$, (b)$Fo=1.90$, (c)$Fo=2.90$ and (d)$Fo=4.16$ in presence of electric field force (top) and buoyancy force (bottom)

DownLoad: Full-Size Img PowerPoint

图 6 不同电瑞利数T下液体体积分数$f_{\rm l}$随时间的变化曲线

Figure 6. Time evolutions of the liquid fraction $f_{\rm l}$ for different electric Rayleigh numbers T.

DownLoad: Full-Size Img PowerPoint

图 7 不同电瑞利数下$Fo=1.9$时电荷密度(上)、温度(中)以及流场(下)分布:　(a) $T=0$; (b) $T=400$; (c) $T=800$; (d) $T=1600$; (e) $T=2400$

Figure 7. Distribution of the charge density (top), temperature (middle) and streamlines (bottom) at $Fo=1.9$ under different electrical Rayleigh numbers: (a) $T=0$; (b) $T=400$; (c) $T=800$; (d) $T=1600$; (e) $T=2400$.

DownLoad: Full-Size Img PowerPoint

图 8 $Fo=1.9$时　(a)直线$x=1/(4\delta)$上速度水平分量u的分布; (b)固液界面位置

Figure 8. (a) Distributions of the horizontal velocity along line of $x=1/(4\delta)$ and (b) the liquid-solid interface at $Fo=1.9$

DownLoad: Full-Size Img PowerPoint

图 9 (a)斯蒂芬数$Ste$对电场加速熔化效果的影响; (b)液相最大速度$V_{\rm max}$随液体体积分数$f_{\rm l}$的变化趋势

Figure 9. (a) The effect of Stefan number $Ste$ on the melting time saving; (b) evolutions of the maximum fluid velocity $V_{\rm max}$ versus the liquid fraction $f_{\rm l}$.

DownLoad: Full-Size Img PowerPoint

图 10 $T=1000$时, 不同的斯蒂芬数下, PCM熔化到$f_{\rm l}=0.3$, $f_{\rm l}=0.5$, $f_{\rm l}=0.9$时电荷密度、温度以及流场分布　(a)$Ste= $$ 0.05$; (b)$Ste=0.1$

Figure 10. With $T=1000$, distributions of charge density, temperature field and streamlines of PCM melting at $f_{\rm l}=0.3$, $f_{\rm l}=0.5$, $f_{\rm l}=0.9$ for different Stefan number: (a) $Ste=0.05$; (b) $Ste=0.1$.

DownLoad: Full-Size Img PowerPoint

图 11 $T=3200$ 时, 不同的斯蒂芬数下, PCM熔化到$f_{\rm l}=0.3$, $f_{\rm l}=0.5$, $f_{\rm l}=0.9$ 时电荷密度、温度以及流场分布　(a)$Ste= $$ 0.05$; (b)$Ste=0.1$

Figure 11. With $T=3200$, distributions of charge density, temperature field and streamlines of PCM melting at $f_{\rm l}=0.3$, $f_{\rm l}=0.5$, $f_{\rm l}=0.9$ for different Stefan number: (a) $Ste=0.05$; (b) $Ste=0.1$.

DownLoad: Full-Size Img PowerPoint

图 12 无量纲离子迁移率M与普朗特数$Pr$对电场强化相变传热效果的影响

Figure 12. The effect of M and $Pr$ on the melting time saving.

DownLoad: Full-Size Img PowerPoint

图 13 M取不同值, PCM完全熔化时电荷密度和温度分布图　(a)$Pr=1$; (b)$Pr=20$

Figure 13. Distributions of charge density and temperature field when PCM is completely melted for (a) $Pr=1$ and (b) $Pr=20$.

DownLoad: Full-Size Img PowerPoint

[1]	Luo X, Wang J H, Dooner M, Clarke J 2015 Appl. Energy 137 511 Google Scholar
[2]	Chen H S, Cong T N, Yang W, Tan C Q, Li Y L, Ding Y L 2009 Prog. Nat. Sci. 19 291 Google Scholar
[3]	霍宇涛 2018 博士学位论文 (徐州: 中国矿业大学) Huo Y T 2018 Ph. D. Dissertation (Xuzhou: China University of Mining and Technology) (in Chinese)
[4]	Ren Q L, Meng F L, Guo P H 2018 Int. J. Heat Mass Transfer 121 1214 Google Scholar
[5]	赵耀 2018 博士学位论文 (上海: 上海交通大学) Zhao Y 2018 Ph. D. Dissertation (Shanghai: Shanghai Jiao Tong University) (in Chinese)
[6]	Sharma A, Tyagi V V, Chen C R, Buddhi D 2009 Renewable Sustainable Energy Rev. 13 318 Google Scholar
[7]	Agyenim F, Hewitt N, Eames P, Smyth M 2010 Renewable Sustainable Energy Rev. 14 615 Google Scholar
[8]	Ren Q L 2019 Energy Convers. Manage. 180 784 Google Scholar
[9]	Stritih U 2004 Int. J. Heat Mass Transfer 47 2841 Google Scholar
[10]	Lacroix M, Benmadda M 1997 Numer. Heat Tranfer, Part A 31 71 Google Scholar
[11]	Ji C Z, Qin Z, Low Z H, Dubey S, Choo F H, Duan F 2018 Appl. Therm. Eng. 129 269 Google Scholar
[12]	Khodadadi J M, Hosseinizadeh S F 2007 Int. Commun. Heat Mass Transfer 34 534 Google Scholar
[13]	Feng Y C, Li H X, Li L X, Bu L, Wang T 2015 Int. J. Heat Mass Transfer 81 415 Google Scholar
[14]	Xiao X, Zhang P, Li M 2014 Int. J. Therm. Sci. 81 94 Google Scholar
[15]	张涛, 余建祖 2007 制冷学报 6 13 Google Scholar Zhang T, Yu J Z 2007 J. Refrigeration 6 13 Google Scholar
[16]	Fan L W, Zhu Z Q, Zeng Y, Ding Q, Liu M J 2016 Int. J. Heat Mass Transfer 95 1057 Google Scholar
[17]	Fan L W, Zhu Z Q, Liu M J, Xu C L, Zeng Y, Lu H, Tao Y Z 2016 J. Heat Transfer-Trans. ASME 138 122402 Google Scholar
[18]	Oh Y K, Park S H, Cha K O 2001 KSME Int. J. 15 1882 Google Scholar
[19]	Oh Y K, Park S H, Cho Y I 2002 Int. J. Heat Mass Transfer 45 4631 Google Scholar
[20]	Nakhla D, Sadek H, Cotton J S 2015 Int. J. Heat Mass Transfer 81 695 Google Scholar
[21]	Rashidi S, Bafekr H, Masoodi R, Languri M E 2017 J. Electrostat. 8 1 Google Scholar
[22]	Atten P, Mc Cluskey F, Pérez A 1988 IEEE Transactions on Electrical Insulation 23 659 Google Scholar
[23]	Traoré P, Pérez A T, Koulova D, Romat H 2010 J. Fluid Mech. 658 279 Google Scholar
[24]	Wu J, Traoré P, Zhang M, Pérez A T, Vázquez P A 2016 Int. J. Heat Mass Transfer 92 139 Google Scholar
[25]	陈凤, 彭耀, 宋耀祖, 陈民 2007 工程热物理学报 4 679 Google Scholar Chen F, Peng Y, Song Y Z, Chen M 2007 J. Eng. Therm. 4 679 Google Scholar
[26]	Gao M, Cheng P, Quan X 2013 Int. J. Heat Mass Transfer 67 984 Google Scholar
[27]	Sadek H, Ching C Y, Cotton J 2010 Int. J. Heat Mass Transfer 53 3721 Google Scholar
[28]	陈春天, 杨嘉祥, 张颖, 李静 2004 工程热物理学报 2 284 Google Scholar Chen C T, Yang J X, Zhang Y, Li J 2004 J. Eng. Therm. 2 284 Google Scholar
[29]	李典, 王太, 陈烁, 谢英柏, 刘春涛 2020 工程热物理学报 41 2752 Li D, Wang T, Chen L, Xie Y B, Liu C T 2020 J. Eng. Therm. 41 2752
[30]	危卫, 张云伟, 顾兆林 2013 科学通报 58 197 Google Scholar Wei W, Zhang Y W, Gu Z L 2013 Chin. Sci. Bull. 58 197 Google Scholar
[31]	Nakhla D, Thompson E, Lacroix B, Cotton J S 2018 J. Electrostat. 92 31 Google Scholar
[32]	Luo K, Pérez A T, Wu J, Yi H L, Tan H P 2019 Phys. Rev. E 100 013306 Google Scholar
[33]	卢才磊 2020 硕士学位论文 (哈尔滨: 哈尔滨工业大学) Lu C L 2020 M. D. Thesis (Haerbin: Harbin Institute of Technology) (in Chinese)
[34]	Selvakumar R D, Liu Q, Luo K, Traoré P, Wu J 2021 Int. J. Multiphase Flow 136 103550 Google Scholar
[35]	Nakhla D, Cotton J S 2021 Int. J. Heat Mass Transfer 167 120828 Google Scholar
[36]	Luo K, Wu J, Pérez A T, Yi H L, Tan H P 2019 Phys. Rev. Fluids 4 083702 Google Scholar
[37]	Huang R Z, Wu H Y 2015 J. Comput. Phys. 294 346 Google Scholar
[38]	罗康 2017 博士学位论文 (哈尔滨: 哈尔滨工业大学) Luo K 2017 Ph. D. Dissertation (Haerbin: Harbin Institute of Technology) (in Chinese)
[39]	Chen S, Doolen G D 1998 Annu. Rev. Fluid Mech. 30 329 Google Scholar
[40]	Wang L, Zhao Y, Yang X G, Shi B C, Chai Z H 2019 Appl. Math. Model. 71 31 Google Scholar
[41]	黄昌盛, 张文欢, 侯志敏, 陈俊辉, 李明晶, 何南忠, 施保昌 2011 科学通报 56 2434 Google Scholar Huang C S, Zhang W H, Hou Z M, Chen J H, Li M J, He N Z, Shi B C 2011 Chin. Sci. Bull. 56 2434 Google Scholar
[42]	李洋, 苏婷, 梁宏, 徐江荣 2018 物理学报 67 224701 Google Scholar Li Y, Su T, Liang H, Xu J R 2018 Acta Phys. Sin. 67 224701 Google Scholar
[43]	梁宏 2015 博士学位论文 (武汉: 华中科技大学) Liang H 2015 Ph. D. Dissertation (Wuhan: Huazhong University of Science and Technology) (in Chinese)
[44]	李庆, 余悦, 唐诗 2020 科学通报 65 1677 Google Scholar Li Q, Yu Y, Tang S 2020 Chin. Sci. Bull. 65 1677 Google Scholar
[45]	朱炼华, 郭照立 2015 计算物理 32 20 Google Scholar Zhu L H, Guo Z L 2015 Chin. J. Comput. Phys. 32 20 Google Scholar
[46]	刘高洁, 郭照立, 施保昌 2016 物理学报 65 014702 Google Scholar Liu G J, Guo Z L, Shi B C 2016 Acta Phys. Sin. 65 014702 Google Scholar
[47]	吴健, 张蒙齐, 田方宝 2018 力学学报 50 1458 Google Scholar Wu J, Zhang M Q, Tian F B 2018 Chin. J. Theor. Appl. Mech. 50 1458 Google Scholar
[48]	Luo K, Wu J, Yi H L, Tan H P 2016 Phys. Rev. E 93 023309 Google Scholar
[49]	Wang L, Wei Z C, Li T F, Chai Z H, Shi B C 2021 Appl. Math. Model 95 361 Google Scholar
[50]	Guo Z L, Shi B C, Wang N C 2000 J. Comput. Phys. 165 288 Google Scholar
[51]	Guo Z L, Zheng C G, Shi B C 2002 Phys. Rev. E 65 046308 Google Scholar
[52]	Chai Z H, Shi B C 2008 Appl. Math. Model. 32 2050 Google Scholar
[53]	Lu J H, Lei H Y, Dai C S 2019 Int. J. Therm. Sci. 135 17 Google Scholar
[54]	Huang R Z, Wu H Y 2016 J. Comput. Phys. 315 65 Google Scholar
[55]	Guo Z L, Zheng C G, Shi B C 2002 Phys. Fluids 14 2007 Google Scholar
[56]	Huang R Z, Wu H Y, Cheng P 2013 Int. J. Heat Mass Transfer 59 295 Google Scholar

[1]	Lai Yao-Yao, Chen Xin-Meng, Chai Zhen-Hua, Shi Bao-Chang. Lattice Boltzmann method based feedback control approach for pinned spiral waves. Acta Physica Sinica, 2024, 73(4): 040502. doi: 10.7498/aps.73.20231549
[2]	Liu Cheng, Liang Hong. Axisymmetric lattice Boltzmann model for three-phase fluids and its application to the Rayleigh-Plateau instability. Acta Physica Sinica, 2023, 72(4): 044701. doi: 10.7498/aps.72.20221967
[3]	Zhang Xiao-Lin, Huang Jun-Jie. Study on wetting and spreading behaviors of compound droplets on wedge by lattice Boltzmann method. Acta Physica Sinica, 2023, 72(2): 024701. doi: 10.7498/aps.72.20221472
[4]	Ma Cong, Liu Bin, Liang Hong. Lattice Boltzmann simulation of three-dimensional fluid interfacial instability coupled with surface tension. Acta Physica Sinica, 2022, 71(4): 044701. doi: 10.7498/aps.71.20212061
[5]	Zhang Heng, Ren Feng, Hu Hai-Bao. Transitions of power-law fluids in two-dimensional lid-driven cavity flow using lattice Boltzmann method. Acta Physica Sinica, 2021, 70(18): 184703. doi: 10.7498/aps.70.20210451
[6]	Huang Hu, Hong Ning, Liang Hong, Shi Bao-Chang, Chai Zhen-Hua. Lattice Boltzmann simulation of the droplet impact onto liquid film. Acta Physica Sinica, 2016, 65(8): 084702. doi: 10.7498/aps.65.084702
[7]	Liang Hong, Chai Zhen-Hua, Shi Bao-Chang. Lattice Boltzmann simulation of droplet dynamics in a bifurcating micro-channel. Acta Physica Sinica, 2016, 65(20): 204701. doi: 10.7498/aps.65.204701
[8]	Xie Wen-Jun, Teng Peng-Fei. Study of acoustic levitation by lattice Boltzmann method. Acta Physica Sinica, 2014, 63(16): 164301. doi: 10.7498/aps.63.164301
[9]	Ren Sheng, Zhang Jia-Zhong, Zhang Ya-Miao, Wei Ding. Phase transition in liquid due to zero-net-mass-flux jet and its numerical simulation using lattice Boltzmann method. Acta Physica Sinica, 2014, 63(2): 024702. doi: 10.7498/aps.63.024702
[10]	Liu Qiu-Zu, Kou Zi-Ming, Jia Yue-Mei, Wu Juan, Han Zhen-Nan, Zhang Qian-Qian. Wettability alteration simulation of modified hydrophobic solid surface by lattice Boltzmann method. Acta Physica Sinica, 2014, 63(10): 104701. doi: 10.7498/aps.63.104701
[11]	Shi Dong-Yan, Wang Zhi-Kai, Zhang A-Man. A novel lattice Boltzmann method for dealing with arbitrarily complex fluid-solid boundaries. Acta Physica Sinica, 2014, 63(7): 074703. doi: 10.7498/aps.63.074703
[12]	Zeng Jian-Bang, Li Long-Jian, Jiang Fang-Ming. Numerical investigation of bubble nucleation process using the lattice Boltzmann method. Acta Physica Sinica, 2013, 62(17): 176401. doi: 10.7498/aps.62.176401
[13]	Guo Ya-Li, Xu He-Han, Shen Sheng-Qiang, Wei Lan. Nanofluid Raleigh-Benard convection in rectangular cavity: simulation with lattice Boltzmann method. Acta Physica Sinica, 2013, 62(14): 144704. doi: 10.7498/aps.62.144704
[14]	Liu Qiu-Zu, Kou Zi-Ming, Han Zhen-Nan, Gao Gui-Jun. Dynamic process simulation of droplet spreading on solid surface by lattic Boltzmann method. Acta Physica Sinica, 2013, 62(23): 234701. doi: 10.7498/aps.62.234701
[15]	Jiang Fang-Ming, Liao Quan, Zeng Jian-Bang, Li Long-Jian. Simulation of bubble growth process in pool boilingusing lattice Boltzmann method. Acta Physica Sinica, 2011, 60(6): 066401. doi: 10.7498/aps.60.066401
[16]	Shi Zi-Yuan, Hu Guo-Hui, Zhou Zhe-Wei. Lattice Boltzmann simulation of droplet motion driven by gradient of wettability. Acta Physica Sinica, 2010, 59(4): 2595-2600. doi: 10.7498/aps.59.2595
[17]	Zeng Jian-Bang, Li Long-Jian, Liao Quan, Chen Qing-Hua, Cui Wen-Zhi, Pan Liang-Ming. Application of lattice Boltzmann method to phase transition process. Acta Physica Sinica, 2010, 59(1): 178-185. doi: 10.7498/aps.59.178
[18]	Lu Yu-Hua, Zhan Jie-Min. Three-dimensional numerical simulation of thermosolutal convection in enclosures using lattice Boltzmann method. Acta Physica Sinica, 2006, 55(9): 4774-4782. doi: 10.7498/aps.55.4774
[19]	Zhang Chao-Ying, Li Hua-Bing, Tan Hui-Li, Liu Mu-Ren, Kong Ling-Jiang. Lattice Boltzmann simulations of moving elliptic cylinder in a Newtonian fluid. Acta Physica Sinica, 2005, 54(5): 1982-1987. doi: 10.7498/aps.54.1982
[20]	LI HUA-BING, HUANG PING-HUA, LIU MU-REN, KONG LING-JIANG. SIMULATION OF THE MKDV EQUATION WITH LATTICE BOLTZMANN METHOD. Acta Physica Sinica, 2001, 50(5): 837-840. doi: 10.7498/aps.50.837

Catalog

Vol. 70, Issue 14 - 2021-07-20

Metrics

Abstract views: 4075
PDF Downloads: 106
Cited By: 0

姓名
邮箱
手机号码
标题
留言内容
验证码

Search

Article

留言板