三维不可压缩流的12速多松弛格子Boltzmann模型

胡嘉懿; 张文欢; 柴振华; 施保昌; 汪一航

doi:10.7498/aps.68.20190984

摘要

为提高多松弛(MRT)格子Boltzmann模型的计算效率, 运用反演法提出了一个求解三维不可压缩流的12速MRT格子Boltzmann模型(iD3Q12 MRT模型). 这个模型比通常使用的D3Q13 MRT模型具有更高的计算效率. 在数值模拟部分我们把iD3Q12 MRT模型与可压缩性较小的一个13速多松弛模型(He-Luo D3Q13 MRT模型)在精确性和稳定性方面作比较. 通过模拟不同的流动, 包括压力驱动的稳态泊肃叶流、周期变化的压力驱动的非稳态脉动流、顶盖驱动的方腔流, 可以发现iD3Q12 MRT模型模拟以上三种流动时得到的数值解与解析解或与已有的结果符合很好, 这说明我们提出的iD3Q12 MRT模型是准确的. 在模拟稳态的泊肃叶流时, 两个模型计算的速度场的全局相对误差完全相同, 且两个模型都具有二阶的空间精度. 在模拟非稳态脉动流时, 大多情况下是12速模型的计算误差更小, 但在脉动流的最大压降增大时, iD3Q12 MRT模型先发散, 这说明He-Luo D3Q13 MRT模型具有更好的稳定性. 在模拟不同雷诺数下的顶盖驱动的方腔流时, He-Luo D3Q13 MRT模型也比iD3Q12 MRT模型更稳定.

关键词:

Abstract

In order to improve the computational efficiency of multiple-relaxation-time lattice Boltzmann model (MRT), a 12-velocity multiple-relaxation-time lattice Boltzmann model (iD3Q12 MRT model) for three-dimensional incompressible flows is proposed in this work by using an inversion method. This model has higher computational efficiency than the commonly used D3Q13 MRT model in principle. In numerical simulations, the accuracy and stability of iD3Q12 MRT model are validated by simulating different flows, including steady Poiseuille flow driven by pressure, unsteady pulsatile flow driven by periodic pressure and lid-driven cavity flow. We also compare the iD3Q12 MRT model with the 13-velocity multiple-relaxation-time lattice Boltzmann model(He-Luo D3Q13 MRT model).For the Poiseuille flow and pulsatile flow, the numerical solutions of the iD3Q12 MRT model agree well with the analytical solutions. In terms of accuracy, the iD3Q12 MRT model and He-Luo D3Q13 MRT model are used to simulate Poiseuille flow with different parameters. The global relative errors of the two models are identical. Similarly, we also simulate the pulsatile flow to calculate the global relative errors of flow fields at different times and different lattice spacing. It is found that the global relative errors of the iD3Q12 MRT model are smaller than those of the He-Luo D3Q13 MRT model, and both models have the second-order spatial accuracy. Furthermore, we also simulate the pulsatile flow by changing the lattice spacing or relaxation time when the maximal pressure drop of the channel is increased, and it is found that the global relative errors calculated by the iD3Q12 MRT model are smaller than those by the He-Luo D3Q13 MRT model in most cases, but the iD3Q12 MRT model diverges when the maximal pressure drop of the channel is large. This indicates that the iD3Q12 MRT model is more accurate than the He-Luo D3Q13 MRT model in simulating unsteady pulsatile flow, but less stable. For the lid-driven cavity flow, the results show that the numerical results of the iD3Q12 MRT model agree well with those given by Ku et al [Ku H C, Hirsh R S, Taylor T D 1987 J. Comput. Phys. 70 439]. In terms of stability, the iD3Q12 MRT model is quantitatively less stable than He-Luo D3Q13 MRT model.

Keywords:

作者及机构信息

1.
宁波大学数学与统计学院, 浙江　315211

2.
华中科技大学数学与统计学院, 湖北　430074

通信作者: 张文欢, zhangwenhuan@nbu.edu.cn

基金项目: 浙江省自然科学基金(批准号: LQ16A020001)、浙江省教育厅科研基金(批准号: Y201533808)、宁波市自然科学基金(批准号: 2016A610075)和宁波大学王宽诚幸福基金资助的课题

Authors and contacts

1.
School of Mathematics and Statistics, Ningbo University, Zhejiang 315211, China

2.
School of Mathematics and Statistics, Huazhong University of Science and Technology, Hubei 430074, China

Corresponding author: Zhang Wen-Huan, zhangwenhuan@nbu.edu.cn

Funds: Project supported by the Natural Science Foundation of Zhejiang Province, China (Grant No. LQ16A020001), the Scientific Research Foundation of the Education Department of Zhejiang Province, China (Grant No. Y201533808), the Natural Science Foundation of Ningbo, China (Grant No. 2016A610075), and the K.C. Wong Magna Fund in Ningbo University, China.

文章全文 : translate this paragraph

参考文献

[1]	McNamara G R, Zanetti G 1988 Phys. Rev. Lett. 61 2332 Google Scholar
[2]	Higuera F, Jimenez J 1989 Europhys. Lett. 9 663 Google Scholar
[3]	Higuera F, Succi S S, Benzi R 1989 Europhys. Lett. 9 345 Google Scholar
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[5]	He X Y, Luo L S 1997 Phys. Rev. E 56 6811 Google Scholar
[6]	Shan X W, He X Y 1998 Phys. Rev. Lett. 80 65 Google Scholar
[7]	Shan X W, Chen H D 1993 Phys. Rev. E 47 1815 Google Scholar
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[9]	He X Y, Shan X W, Doolen G D 1998 Phys. Rev. E 57 R13
[10]	Qi D W 1999 J. Fluid. Mech. 385 41 Google Scholar
[11]	Chen S Y, Chen H D, Martínez D, Matthaeus W 1991 Phys. Rev. Lett. 67 3776 Google Scholar
[12]	Chen X W, Shi B C 2005 Chin. Phys. Soc. 14 1398 Google Scholar
[13]	Zhang T, Shi B C, Chai Z H 2015 物理学报 64 154701 Google Scholar Pan C X, Luo L S, Miller C T 2015 Acta Phys. Sin. 64 154701 Google Scholar
[14]	Velivelli A C, Bryden K M 2006 Physica A 362 139 Google Scholar
[15]	Ginzburge I 2005 Adv. Water Resour. 28 1171 Google Scholar
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施引文献

图 1 三维泊肃叶流示意图

Fig. 1. The schematic of three-dimensional Poiseuille flow.

下载: 全尺寸图片幻灯片

图 2 泊肃叶流数值解与解析解的对比　(a) 泊肃叶流在$x=1$截面处z取不同的值时水平速度$u_{x}$随y变化的函数图像; (b) 在截面$z=0$处y取不同的值时压力p随x变化的函数图像; 直线: 解析解; 符号: 数值解; 松弛因子$\lambda_{\nu}=1.3$

Fig. 2. Comparison between numerical and analytical solutions of Poiseuille flow: (a) The variation of $u_{x}$ with y for different locations of z at section $x=1$ for Poiseuille flow; (b) the variation of pressure with x for different locations of y at section $z=0$ for Poiseuille flow. Lines, analytical solutions; symbols, numerical results; the relaxation parameter ${\lambda}_{\nu}=1.3$.

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图 3 不同的$\lambda_{\nu}$下, 模拟泊肃叶流得到的速度场的全局相对误差${\rm {GRE}}_u$随空间步长$\text{δ}{x}$的变化, 符号代表数值解, 连线表示拟合直线

Fig. 3. The variation of ${\rm {GRE}}_u$ of velocity field with the lattice spacing $\text{δ}{x}$ at different $\lambda_{\nu}$ for Poiseuille flow. Symbols represent numerical solutions, lines represent fitting line.

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图 4 在$\eta=2.8285$时脉动流在$x=1$, $z=0$处水平速度u_x随y变化的函数. 直线: 解析解; 符号: 数值解

Fig. 4. The variation of horizontal velocity u_x with y for pulsatile flow at the location $x=1$, $z=0$, $\eta=2.8285$. Line, analytical solutions; symbols, numerical solutions.

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图 5 同一周期四个不同时刻下变量${\rm {GRE}}_u$随空间步长$\text{δ}{x}$的变化

Fig. 5. The variation of ${\rm {GRE}}_u$ with the lattice spacing at four different times in a period for pulsatile flow.

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图 6 三维顶盖驱动的方腔流示意图

Fig. 6. The schematic of three-dimensional lid-driven cavity flow

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图 7 不同的雷诺数下模拟方腔流, 在截面$z=0.5$处竖直和水平中心线的速度分布　(a) Re = 100; (b) $Re=400$; (c) $Re=1000$

Fig. 7. The velocity distribution in the vertical and horizontal center lines at section $z=0.5$ for cavity flows at different $Re$: (a) $Re=100$; (b) $Re=400$; (c) $Re=1000$.

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表 1 iD3Q12 MRT和D3Q13 MRT模型在不同松弛因子${\lambda}_{\nu}$和不同空间步长下计算得到的泊肃叶流的速度场的全局相对误差${\rm GRE}_u$

Table 1. The ${\rm GRE}_u$ of velocity field for Poiseuille flow computed by iD3Q12 MRT and D3Q13 MRT models under different relaxation parameters and different lattice spacings.

${\rm GRE}_u$	Lattice spacing $\text{δ} x$				Model
${\rm GRE}_u$	1/8	1/16	1/32	1/64	Model
${\lambda}_{\nu}=0.8,$ ${\lambda}'_{\nu}=1.143$	$3.090\times10^{-2}$	$7.700\times10^{-3}$	$1.900\times10^{-3}$	$4.623\times10^{-4}$	iD3Q12 MRT
${\lambda}_{\nu}=0.8,$ ${\lambda}'_{\nu}=1.143$	$3.090\times10^{-2}$	$7.700\times10^{-3}$	$1.900\times10^{-3}$	$4.623\times10^{-4}$	D3Q13 MRT
${\lambda}_{\nu}=1.0,$ ${\lambda}'_{\nu}=1.333$	$5.990\times10^{-2}$	$1.660\times10^{-2}$	$4.400\times10^{-3}$	$1.100\times10^{-3}$	iD3Q12 MRT
${\lambda}_{\nu}=1.0,$ ${\lambda}'_{\nu}=1.333$	$5.990\times10^{-2}$	$1.660\times10^{-2}$	$4.400\times10^{-3}$	$1.100\times10^{-3}$	D3Q13 MRT
${\lambda}_{\nu}=1.3,$ ${\lambda}'_{\nu}=1.576$	$8.720\times10^{-2}$	$2.500\times10^{-2}$	$6.700\times10^{-3}$	$1.700\times10^{-3}$	iD3Q12 MRT
${\lambda}_{\nu}=1.3,$ ${\lambda}'_{\nu}=1.576$	$8.720\times10^{-2}$	$2.500\times10^{-2}$	$6.700\times10^{-3}$	$1.700\times10^{-3}$	D3Q13 MRT

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表 2 在$\eta=2.8285$时, 不同空间步长下用iD3Q12 MRT模型和D3Q13 MRT模型模拟脉动流所得的不同时刻下的速度场的全局相对误差${\rm GRE}_u$

Table 2. The global relative errors of the velocity field at different times for pulsatile flow simulated by iD3Q12 MRT and D3Q13 MRT models at different lattice spacings, $\eta=2.8285$.

Lattice spacing	${\rm GRE}_u$				Model
Lattice spacing	$T/4$	$T/2$	$3 T/4$	T	Model
${\rm{\text{δ}} } x= {1}/{20}$	$1.483\times10^{-2}$	$4.214\times10^{-2}$	$1.805\times10^{-2}$	$4.028\times10^{-2}$	iD3Q12 MRT
${\rm{\text{δ}} } x= {1}/{20}$	$1.662\times10^{-2}$	$4.733\times10^{-2}$	$2.118\times10^{-2}$	$4.299\times10^{-2}$	D3Q13 MRT
${\rm{\text{δ}} } x= {1}/{40}$	$3.803\times10^{-3}$	$1.199\times10^{-2}$	$4.651\times10^{-3}$	$1.153\times10^{-2}$	iD3Q12 MRT
${\rm{\text{δ}} } x= {1}/{40}$	$4.172\times10^{-3}$	$1.324\times10^{-2}$	$5.398\times10^{-3}$	$1.217\times10^{-2}$	D3Q13 MRT
${\rm{\text{δ}} } x= {1}/{60}$	$1.702\times10^{-3}$	$5.569\times10^{-3}$	$2.085\times10^{-3}$	$5.369\times10^{-3}$	iD3Q12 MRT
${\rm{\text{δ}} } x= {1}/{60}$	$1.855\times10^{-3}$	$6.116\times10^{-3}$	$2.412\times10^{-3}$	$5.648\times10^{-3}$	D3Q13 MRT
${\rm{\text{δ}} } x= {1}/{80}$	$9.605\times10^{-4}$	$3.204\times10^{-3}$	$1.177\times10^{-3}$	$3.092\times10^{-3}$	iD3Q12 MRT
${\rm{\text{δ}} } x= {1}/{80}$	$1.043\times10^{-3}$	$3.509\times10^{-3}$	$1.360\times10^{-3}$	$3.247\times10^{-3}$	D3Q13 MRT

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表 3 相邻空间步长下的iD3Q12 MRT和D3Q13 MRT模型的空间精度的阶

Table 3. The orders of the spatial accuracy of iD3Q12 MRT and D3Q13 MRT models under adjacent spacings.

Adjacent spacing	Order				Model
Adjacent spacing	$T/4$	$T/2$	$3 T/4$	T	Model
Average	1.978	1.875	1.974	1.869	iD3Q12 MRT
Average	1.998	1.891	1.984	1.879	D3Q13 MRT
${1}/{20} \to {1}/{40}$	1.963	1.813	1.956	1.805	iD3Q12 MRT
${1}/{20} \to {1}/{40}$	1.994	1.838	1.972	1.821	D3Q13 MRT
${1}/{40}\to {1}/{60}$	1.983	1.891	1.979	1.885	iD3Q12 MRT
${1}/{40}\to {1}/{60}$	1.999	1.905	1.987	1.893	D3Q13 MRT
${1}/{60} \to {1}/{80}$	1.989	1.922	1.988	1.918	iD3Q12 MRT
${1}/{60} \to {1}/{80}$	2.001	1.931	1.992	1.924	D3Q13 MRT

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表 4 在$\tau=0.5667$, $\eta=4.3416$, 最大压差$\Delta{p}$增大时不同的空间步长下由iD3Q12 MRT和D3Q13 MRT模型模拟的脉动流在时刻T下的速度场所计算的全局相对误差${\rm GRE}_u$, 空白处表示计算发散

Table 4. The global relative error calculated by the velocity field at time T of pulsatile flow simulated by the iD3Q12 MRT and D3Q13 MRT models under different lattice spacings. The maximal pressure drop $ \Delta{p} $ of the channel increases, $\tau=0.5567$, $\eta=4.3416$ are fixed. The blank indicates that the computation is divergent.

$ \Delta p $	Lattice spacing ${\rm{\text{δ}} } x$				Model
$ \Delta p $	1/20	1/40	1/60	1/80	Model
$0.005 $	$9.919\times10^{-2}$	$3.030\times10^{-2}$	$1.442\times10^{-2}$	$8.402\times10^{-3}$	iD3Q12 MRT
$0.005 $	$1.121\times10^{-1}$	$3.326\times10^{-2}$	$1.568\times10^{-2}$	$9.084\times10^{-3}$	D3Q13 MRT
$0.010$	$1.172\times10^{-1}$	$3.445\times10^{-2}$	$1.618\times10^{-2}$	$9.362\times10^{-3}$	iD3Q12 MRT
$0.010$	$1.679\times10^{-1}$	$4.763\times10^{-2}$	$2.199\times10^{-2}$	$1.260\times10^{-2}$	D3Q13 MRT
$0.020$	$1.777\times10^{-1}$	$5.110\times10^{-2}$	$2.365\times10^{-2}$	$1.355\times10^{-2}$	iD3Q12 MRT
$0.020$	$2.940\times10^{-1}$	$8.630\times10^{-2}$	$3.987\times10^{-2}$	$2.279\times10^{-2}$	D3Q13 MRT
$0.050$		$1.243\times10^{-1}$	$5.848\times10^{-2}$	$3.386\times10^{-2}$	iD3Q12 MRT
$0.050$		$2.025\times10^{-1}$	$9.868\times10^{-2}$	$5.757\times10^{-2}$	D3Q13 MRT
$0.080$				$6.073\times10^{-2}$	iD3Q12 MRT
$0.080$			$1.575\times10^{-2}$	$9.405\times10^{-2}$	D3Q13 MRT
$0.100$					iD3Q12 MRT
$0.100$				$1.192\times10^{-1}$	D3Q13 MRT
$0.120$					iD3Q12 MRT
$0.120$				$1.454\times10^{-1}$	D3Q13 MRT

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表 5 在${\rm{\text{δ}}} {x}={1}/{20}$时, 最大压差$\Delta{p}$增大时不同的松弛时间τ下由iD3Q12 MRT和D3Q13 MRT模型模拟的脉动流由T时刻的速度场计算得出的全局相对误差${\rm GRE}_u$, 空白处表示计算发散

Table 5. The global relative error of the velocity field at time T of the pulsatile flow simulated by the iD3Q12 MRT and D3Q13 MRT models under different relaxation time τ. The maximal pressure drop of the channel is increased and ${\rm{\text{δ}}}{x}={1}/{20}$ is fixed. The blank indicates that the computation is divergent.

$\Delta p$	τ				Model
$\Delta p$	0.55	0.60	0.70	0.90	Model
$0.005 $	$1.302\times10^{-1}$	$6.311\times10^{-2}$	$2.955\times10^{-2}$	$1.744\times10^{-2}$	iD3Q12 MRT
$0.005 $	$1.556\times10^{-1}$	$6.560\times10^{-3}$	$3.023\times10^{-2}$	$1.993\times10^{-2}$	D3Q13 MRT
$0.010$	$1.612\times10^{-1}$	$6.830\times10^{-2}$	$2.711\times10^{-2}$	$1.736\times10^{-2}$	iD3Q12 MRT
$0.010$	$2.435\times10^{-1}$	$8.735\times10^{-2}$	$2.661\times10^{-2}$	$2.058\times10^{-2}$	D3Q13 MRT
$0.020$	$2.475\times10^{-1}$	$9.926\times10^{-2}$	$2.624\times10^{-2}$	$1.656\times10^{-2}$	iD3Q12 MRT
$0.020$	$4.182\times10^{-1}$	$1.542\times10^{-1}$	$2.757\times10^{-2}$	$2.195\times10^{-2}$	D3Q13 MRT
$0.030$		$1.430\times10^{-1}$	$3.421\times10^{-2}$	$1.509\times10^{-2}$	iD3Q12 MRT
$0.030$	$5.482\times10^{-1}$	$2.193\times10^{-1}$	$3.616\times10^{-2}$	$2.343\times10^{-2}$	D3Q13 MRT
$0.040$			$5.001\times10^{-2}$	$1.349\times10^{-2}$	iD3Q12 MRT
$0.040$			$4.693\times10^{-2}$	$2.502\times10^{-2}$	D3Q13 MRT
$0.050$				$1.291\times10^{-2}$	iD3Q12 MRT
$0.050$				$2.674\times10^{-2}$	D3Q13 MRT

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表 6 不断增大雷诺数比较iD3Q12 MRT和He-Luo D3Q13 MRT模型在模拟方腔流时的稳定性. $\checkmark$代表收敛, 收敛准则是(39)式

Table 6. Comparing the stability of iD3Q12 MRT and He-Luo D3Q13 MRT models for three-dimensional cavity flows when the Reynolds number is continuously increased. The tick represents convergence, the convergence criterion is formula (39).

Re	Model
Re	iD3Q12 MRT	He-Luo D3Q13 MRT
100	$\checkmark$	$\checkmark$
400	$\checkmark$	$\checkmark$
1000	$\checkmark$	$\checkmark$
1500	$\checkmark$	$\checkmark$
1600	$\checkmark$	$\checkmark$
1700	divergent	$\checkmark$
1800	divergent	divergent

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[1]	McNamara G R, Zanetti G 1988 Phys. Rev. Lett. 61 2332 Google Scholar
[2]	Higuera F, Jimenez J 1989 Europhys. Lett. 9 663 Google Scholar
[3]	Higuera F, Succi S S, Benzi R 1989 Europhys. Lett. 9 345 Google Scholar
[4]	Abe T 1997 J. Comput. Phys. 131 241 Google Scholar
[5]	He X Y, Luo L S 1997 Phys. Rev. E 56 6811 Google Scholar
[6]	Shan X W, He X Y 1998 Phys. Rev. Lett. 80 65 Google Scholar
[7]	Shan X W, Chen H D 1993 Phys. Rev. E 47 1815 Google Scholar
[8]	张良奇 2014 博士学位论文 (重庆: 重庆大学) Zhang L Q 2014 Ph. D. Dissertation (Chongqing: Chongqing University)
[9]	He X Y, Shan X W, Doolen G D 1998 Phys. Rev. E 57 R13
[10]	Qi D W 1999 J. Fluid. Mech. 385 41 Google Scholar
[11]	Chen S Y, Chen H D, Martínez D, Matthaeus W 1991 Phys. Rev. Lett. 67 3776 Google Scholar
[12]	Chen X W, Shi B C 2005 Chin. Phys. Soc. 14 1398 Google Scholar
[13]	Zhang T, Shi B C, Chai Z H 2015 物理学报 64 154701 Google Scholar Pan C X, Luo L S, Miller C T 2015 Acta Phys. Sin. 64 154701 Google Scholar
[14]	Velivelli A C, Bryden K M 2006 Physica A 362 139 Google Scholar
[15]	Ginzburge I 2005 Adv. Water Resour. 28 1171 Google Scholar
[16]	Chai Z H, Shi B C, Guo Z L 2016 J. Sci. Comput. 69 355 Google Scholar
[17]	Chai Z H, Shi B C 2008 Appl. Math. Model. 32 2050 Google Scholar
[18]	Du R, Sun D K, Shi B C, Chai Z H 2019 Appl. Math. Comput. 358 80
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