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Turbulence model combined with machine learning is one of the research hotspots in fluid mechanics. The existing approaches reconstruct or modify the turbulence eddy viscosity or Reynolds stress based on the experimental/numerical data. In this paper, we reconstruct the mapping function between intermittency and the mean flow variables by deep neural network (ResNet), developing an quasi-algebraic transition model coupled with the Spallart-Allmaras (SA) model. We mainly concentrate on the natural transition flows and take the results calculated by the computational fluid dynamics solver with the SST-γ-Reθ model as the training data. Seventeen local mean flow quantities satisfying the Galilean invariants are selected as the input features. Five-time cross validation is performed to avoid overfitting. Combining with the high-precision weighted compact nonlinear format, S&K, T3a- transition plate and S809 airfoil are used to test the performance of the model. The results are compared with those from the SST-γ-Reθ transition model, showing that the pure data-driven ResNet model can predict the intermittent field accurately, which greatly improves the ability of SA model to simulate the natural transition flow. For the example of S&K and T3a- transition plate, the comparison of wall friction shows that the SA-ResNet model is in good agreement with the experimental result, but the BC model, which is also an algebraic model, predicts the transition position of the T3a- transition plate model prematurely. The training data do not contain any numerical solution about airfoil, but the model can still be applied to the case of S809 airfoil with different attack angles. The predicted results of lift resistance characteristics, frictional coefficient distribution and transition position are close to the results from the SST-γ-Reθ transition model. On this basis, another advantage of the model is the solution efficiency. The efficiency is improved more significantly in the case with larger mesh quantity. With the same convergence accuracy, the CPU time required by the SA-ResNet model for the S&K plate case is 85.6% that of the SST-γ-Reθ transition model, while the CPU time required by the S809 airfoil with a larger mesh volume is only 67.2% that of the later model. This study demonstrates the great potential of machine learning in the construction of transition models.
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Keywords:
- transition flow /
- neural network /
- intermittency /
- weighted compact nonlinear scheme
[1] Crouch J 2008 38th Fluid Dynamics Conference and Exhibit Seattle, Washington, June 23–26, 2008 p3832
[2] Lardeau S, Li N, Leschziner M A 2006 J. Turbomach. 129 311Google Scholar
[3] Gropp W, Khodadoust A, Slotnick J, Mavriplis D, Darmofal D, Alonso J, Lurie E http://ntrs.nasa.gov/search.jsp?R= 20140003093
[4] Rumsey C L 2016 52nd Aerospace Sciences Meeting National Harbor, Maryland, January 13–17, 2014 p201
[5] 符松, 王亮 2007 力学进展 37 409Google Scholar
Fu S, Wang L 2007 Adv. Mech. 37 409Google Scholar
[6] Dhawan S, Narasimha R 1958 J. Fluid Mech. 3 418Google Scholar
[7] Libby P A 1975 J. Fluid Mech. 68 273Google Scholar
[8] Cho J R 1982 J. Fluid Mech. 237 301Google Scholar
[9] Steelant J, Dick E 2001 J. Fluids Eng. 123 22Google Scholar
[10] Menter F R, Langtry R B, Likki S R, Suzen Y B, Huang P G, Voölker S 2006 J. Turbomach. 128 413Google Scholar
[11] Langtry R B, Menter F R, Likki S R, Suzen Y B, Huang P G, Voölker S 2006 J. Turbomach. 128 423Google Scholar
[12] Langtry R B, Menter F R 2009 AIAA J. 47 2894Google Scholar
[13] Howison J, Ekici K 2015 Wind Energy 18 2047Google Scholar
[14] Nandi T N, Brasseur J, Vijayakumar G 2016 34th Wind Energy Symposium San Diego, California, USA, January 4–8, 2016 p520
[15] 王光学, 王圣业, 葛明明, 邓小刚 2018 67 175Google Scholar
Wang G X, Wang S Y, Ge M M, Deng X G 2018 Acta Phys. Sin. 67 175Google Scholar
[16] Bas O, Cakmakcioglu S C, Kaynak U 2013 31st AIAA Applied Aerodynamics Conference San Diego, CA, June 24–27, 2013 p2531
[17] Cakmakcioglu S C, Bas O, Kaynak U 2017 Proc. Inst. Mech. Eng., Part C 232 3915Google Scholar
[18] He K, Zhang X, Ren S, Sun J 2015 arXiv e-prints arXiv: 1512.03385
[19] Ling J, Kurzawski A, Templeton J 2016 J. Fluid Mech. 807 155Google Scholar
[20] Ling J, Ruiz A, Lacaze G, Oefelein J 2016 J. Turbomach. 139Google Scholar
[21] Zhang W, Zhu L, Liu Y, Kou J 2018 arXiv e-prints arXiv: 1806.05904
[22] Zhang Z J, Duraisamy K 2015 22 nd AIAA Computational Fluid Dynamics Conference Dallas, TX, USA, June 22–26, 2015 p2460
[23] Duraisamy K, Zhang Z J, Singh A P 2015 53 rd AIAA Aerospace Sciences Meeting Kissimmee, Florida, January 5–9, 2015 p1284
[24] Ge X, Arolla S, Durbin P 2014 Flow, Turbul. Combust. 93 37Google Scholar
[25] Wang Y, Zhang Y, Li S, Meng D 2015 Chin. J. Aeronaut. 28 704Google Scholar
[26] 李松 2015 博士学位论文 (绵阳: 中国空气动力研究与发展中心)
Li S 2015 Ph. D. Dissertation (Mianyang: China Aerodynamics Research and Development Center) (in Chinese)
[27] Deng X, Liu X, Mao M, Zhang H 2012 17th AIAA Computational Fluid Dynamics Conference Toronto, Ontario, Canada, June 6–9, 2005 p5246
[28] Deng X, Zhang H 2000 J. Comput. Phys. 165 22Google Scholar
[29] Spalart P, Allmaras S 30th Aerospace Sciences Meeting and Exhibit Reno, NV, U.S.A. January 6–9, 1992 p439
[30] Singh A P, Medida S, Duraisamy K 2017 AIAA J. 55 2215Google Scholar
[31] Medida S, Baeder J 2012 20th AIAA Computational Fluid Dynamics Conference Honolulu, Hawaii, June 27–30, 2011 p3979
[32] 周志华 2016 机器学习(北京: 清华大学出版社) 第113—114页
Zhou Z H 2016 Machine learning (Beijing: Tsinghua University Press) pp113–114 (in Chinese)
[33] Kingma D P, Ba J 2014 arXiv e-prints arXiv: 1412.6980
[34] Wang J X, Wu J L, Xiao H 2017 Phys. Rev. Fluids 2 034603Google Scholar
[35] 王圣业, 王光学, 董义道, 邓小刚 2017 66 184701Google Scholar
Wang S Y, Wang G X, Dong Y D, Deng X G 2017 Acta Phys. Sin. 66 184701Google Scholar
[36] 陈勇, 郭隆德, 彭强, 陈志强, 刘卫红 2015 64 134701Google Scholar
Chen Y, Guo L D, Peng Q, Chen Z Q, Liu W H 2015 Acta Phys. Sin. 64 134701Google Scholar
[37] Somers D M 1997 Design and Experimental Results for the S809 Airfoil Report
[38] Wang S, Ge M, Deng X, Yu Q, Wang G 2019 AIAA J. 57 4684Google Scholar
[39] Bengio Y 1994 IEEE Trans. Neural Networks 2 157Google Scholar
[40] Glorot X, Bengio Y 2010 J. Mach. Learn. Res. Proc. Track 9 249
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图 7 T3A-平板间歇因子和湍流黏性分布 (a) SST-γ-Reθ预测γ场; (b) SA-ResNet预测γ场; (c) SST-γ-Reθ和SA-ResNet预测γ的差异; (d) SA-ResNet预测的湍流黏性
Figure 7. Intermittency and turbulent viscosity distribution of T3A- case: (a) γ from SST-γ-Reθ; (b) γ from SA-ResNet; (c) discrepancy of γ between SST-γ-Reθ and SA-ResNet; (d) turbulent viscosity from SA-ResNet.
表 1 作为神经网络输入的流场局部平均特征量
Table 1. The local average flow features used as the inputs of neural network.
Feature Sign Feature Sign Density $\rho $ Scalar function 3[19] ${\rm Tr}({ {{S} }^3})$ Nearest wall distance ${d_w}$ Scalar function 4[19] ${\rm Tr}({ {{\varOmega } }^2}{{S} })$ Turbulence intensity Tu Scalar function 5[19] ${\rm Tr}({ {{\varOmega } }^2}{ {{S} }^2})$ Kinematic viscosity $\nu $ Normalized strain rate ${{\left\| {{S}} \right\|} / {\left( {\left\| {{S}} \right\|{\rm{ + }}\left\| {{\varOmega }} \right\|} \right)}}$ Eddy viscosity ${\nu _t}$ Vortex Reynolds number (strain rate) ${{\rho d_w^2 S} / \mu }$ Reciprocal of local velocity $1/U$ Vortex Reynolds number (vorticity) ${{\rho d_w^2\Omega } / \mu }$ Scalar function 1[19] ${\rm Tr}({ {{S} }^2})$ Q criterion[34] $\dfrac{ {\dfrac{1}{2}\left( { { {\left\| {{\varOmega } } \right\|}^2} - { {\left\| {{S} } \right\|}^2} } \right)} }{ {\dfrac{1}{2}\left( { { {\left\| {{\varOmega } } \right\|}^2} - { {\left\| {{S} } \right\|}^2} } \right) + { {\left\| {{S} } \right\|}^2} } }$ Scalar function 2[19] ${\rm Tr}({ {{\varOmega } }^2})$ Ratio of modified viscosity to
kinematic viscosity (χ)${{\widetilde \nu } / \nu }$ Dimensionless quantity similar to
turbulent viscosity${{{\nu _t}} / {\left( {U{d_w}} \right)}}$ 表 2 5次交叉验证结果
Table 2. Results of fivefold cross validation.
Fold Training error Validation error 1 0.011719 0.013654 2 0.012549 0.010681 3 0.015313 0.018738 4 0.012985 0.015888 5 0.015822 0.014451 表 3 平板算例入口条件
Table 3. The entry condition of plate cases.
Case U/m·s–1 Re∞ Tu∞/% S&K 50.1 3.4 × 106 0.179 T3A- 19.8 1.4 × 106 0.843 表 4 模型计算时间对比(残差收敛至O(10–4))
Table 4. Comparison of transition model’s compu-ting time.
ComputingTime SA SA-ResNet SST-γ-Reθ S&K 1.0 1.11 1.30 T3A- 1.0 1.33 1.49 S809 (α = 3°) 1.0 1.20 1.78 -
[1] Crouch J 2008 38th Fluid Dynamics Conference and Exhibit Seattle, Washington, June 23–26, 2008 p3832
[2] Lardeau S, Li N, Leschziner M A 2006 J. Turbomach. 129 311Google Scholar
[3] Gropp W, Khodadoust A, Slotnick J, Mavriplis D, Darmofal D, Alonso J, Lurie E http://ntrs.nasa.gov/search.jsp?R= 20140003093
[4] Rumsey C L 2016 52nd Aerospace Sciences Meeting National Harbor, Maryland, January 13–17, 2014 p201
[5] 符松, 王亮 2007 力学进展 37 409Google Scholar
Fu S, Wang L 2007 Adv. Mech. 37 409Google Scholar
[6] Dhawan S, Narasimha R 1958 J. Fluid Mech. 3 418Google Scholar
[7] Libby P A 1975 J. Fluid Mech. 68 273Google Scholar
[8] Cho J R 1982 J. Fluid Mech. 237 301Google Scholar
[9] Steelant J, Dick E 2001 J. Fluids Eng. 123 22Google Scholar
[10] Menter F R, Langtry R B, Likki S R, Suzen Y B, Huang P G, Voölker S 2006 J. Turbomach. 128 413Google Scholar
[11] Langtry R B, Menter F R, Likki S R, Suzen Y B, Huang P G, Voölker S 2006 J. Turbomach. 128 423Google Scholar
[12] Langtry R B, Menter F R 2009 AIAA J. 47 2894Google Scholar
[13] Howison J, Ekici K 2015 Wind Energy 18 2047Google Scholar
[14] Nandi T N, Brasseur J, Vijayakumar G 2016 34th Wind Energy Symposium San Diego, California, USA, January 4–8, 2016 p520
[15] 王光学, 王圣业, 葛明明, 邓小刚 2018 67 175Google Scholar
Wang G X, Wang S Y, Ge M M, Deng X G 2018 Acta Phys. Sin. 67 175Google Scholar
[16] Bas O, Cakmakcioglu S C, Kaynak U 2013 31st AIAA Applied Aerodynamics Conference San Diego, CA, June 24–27, 2013 p2531
[17] Cakmakcioglu S C, Bas O, Kaynak U 2017 Proc. Inst. Mech. Eng., Part C 232 3915Google Scholar
[18] He K, Zhang X, Ren S, Sun J 2015 arXiv e-prints arXiv: 1512.03385
[19] Ling J, Kurzawski A, Templeton J 2016 J. Fluid Mech. 807 155Google Scholar
[20] Ling J, Ruiz A, Lacaze G, Oefelein J 2016 J. Turbomach. 139Google Scholar
[21] Zhang W, Zhu L, Liu Y, Kou J 2018 arXiv e-prints arXiv: 1806.05904
[22] Zhang Z J, Duraisamy K 2015 22 nd AIAA Computational Fluid Dynamics Conference Dallas, TX, USA, June 22–26, 2015 p2460
[23] Duraisamy K, Zhang Z J, Singh A P 2015 53 rd AIAA Aerospace Sciences Meeting Kissimmee, Florida, January 5–9, 2015 p1284
[24] Ge X, Arolla S, Durbin P 2014 Flow, Turbul. Combust. 93 37Google Scholar
[25] Wang Y, Zhang Y, Li S, Meng D 2015 Chin. J. Aeronaut. 28 704Google Scholar
[26] 李松 2015 博士学位论文 (绵阳: 中国空气动力研究与发展中心)
Li S 2015 Ph. D. Dissertation (Mianyang: China Aerodynamics Research and Development Center) (in Chinese)
[27] Deng X, Liu X, Mao M, Zhang H 2012 17th AIAA Computational Fluid Dynamics Conference Toronto, Ontario, Canada, June 6–9, 2005 p5246
[28] Deng X, Zhang H 2000 J. Comput. Phys. 165 22Google Scholar
[29] Spalart P, Allmaras S 30th Aerospace Sciences Meeting and Exhibit Reno, NV, U.S.A. January 6–9, 1992 p439
[30] Singh A P, Medida S, Duraisamy K 2017 AIAA J. 55 2215Google Scholar
[31] Medida S, Baeder J 2012 20th AIAA Computational Fluid Dynamics Conference Honolulu, Hawaii, June 27–30, 2011 p3979
[32] 周志华 2016 机器学习(北京: 清华大学出版社) 第113—114页
Zhou Z H 2016 Machine learning (Beijing: Tsinghua University Press) pp113–114 (in Chinese)
[33] Kingma D P, Ba J 2014 arXiv e-prints arXiv: 1412.6980
[34] Wang J X, Wu J L, Xiao H 2017 Phys. Rev. Fluids 2 034603Google Scholar
[35] 王圣业, 王光学, 董义道, 邓小刚 2017 66 184701Google Scholar
Wang S Y, Wang G X, Dong Y D, Deng X G 2017 Acta Phys. Sin. 66 184701Google Scholar
[36] 陈勇, 郭隆德, 彭强, 陈志强, 刘卫红 2015 64 134701Google Scholar
Chen Y, Guo L D, Peng Q, Chen Z Q, Liu W H 2015 Acta Phys. Sin. 64 134701Google Scholar
[37] Somers D M 1997 Design and Experimental Results for the S809 Airfoil Report
[38] Wang S, Ge M, Deng X, Yu Q, Wang G 2019 AIAA J. 57 4684Google Scholar
[39] Bengio Y 1994 IEEE Trans. Neural Networks 2 157Google Scholar
[40] Glorot X, Bengio Y 2010 J. Mach. Learn. Res. Proc. Track 9 249
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