A trigonometric series expansion method for the Orr-Sommerfeld equation

doi:10.1007/s10483-019-2484-9

Applied Mathematics and Mechanics (English Edition) ›› 2019, Vol. 40 ›› Issue (6): 877-888.doi: https://doi.org/10.1007/s10483-019-2484-9

A trigonometric series expansion method for the Orr-Sommerfeld equation

Ying TAN^1,2, Weidong SU^1,2

1. State Key Laboratory for Turbulence and Complex Systems, Peking University, Beijing 100871, China;
2. Department of Mechanics and Engineering Science, College of Engineering, Peking University, Beijing 100871, China

收稿日期:2018-03-07 修回日期:2018-11-25 出版日期:2019-06-01 发布日期:2019-06-01
通讯作者: Weidong SU E-mail:swd@pku.edu.cn
基金资助:
Project supported by the National Natural Science Foundation of China (Nos. 11221062, 11521091, and 91752203)

A trigonometric series expansion method for the Orr-Sommerfeld equation

Ying TAN^1,2, Weidong SU^1,2

1. State Key Laboratory for Turbulence and Complex Systems, Peking University, Beijing 100871, China;
2. Department of Mechanics and Engineering Science, College of Engineering, Peking University, Beijing 100871, China

Received:2018-03-07 Revised:2018-11-25 Online:2019-06-01 Published:2019-06-01
Contact: Weidong SU E-mail:swd@pku.edu.cn
Supported by:
Project supported by the National Natural Science Foundation of China (Nos. 11221062, 11521091, and 91752203)

摘要/Abstract

摘要： A trigonometric series expansion method and two similar modified methods for the Orr-Sommerfeld equation are presented. These methods use the trigonometric series expansion with an auxiliary function added to the highest order derivative of the unknown function and generate the lower order derivatives through successive integrations. The proposed methods are easy to implement because of the simplicity of the chosen basis functions. By solving the plane Poiseuille flow (PPF), plane Couette flow (PCF), and Blasius boundary layer flow with several homogeneous boundary conditions, it is shown that these methods yield results with the same accuracy as that given by the conventional Chebyshev collocation method but with better robustness, and that obtained by the finite difference method but with fewer modal number.

关键词: generalized variational principle, dynamical analysis of structure, elastoplastic analysis, blast-resistant underground structure, eigenvalue problem, parallel shear flow, spectral method, trigonometric function, Orr-Sommerfeld equation, hydrodynamical stability

Abstract: A trigonometric series expansion method and two similar modified methods for the Orr-Sommerfeld equation are presented. These methods use the trigonometric series expansion with an auxiliary function added to the highest order derivative of the unknown function and generate the lower order derivatives through successive integrations. The proposed methods are easy to implement because of the simplicity of the chosen basis functions. By solving the plane Poiseuille flow (PPF), plane Couette flow (PCF), and Blasius boundary layer flow with several homogeneous boundary conditions, it is shown that these methods yield results with the same accuracy as that given by the conventional Chebyshev collocation method but with better robustness, and that obtained by the finite difference method but with fewer modal number.

Key words: generalized variational principle, dynamical analysis of structure, elastoplastic analysis, blast-resistant underground structure, hydrodynamical stability, spectral method, trigonometric function, parallel shear flow, eigenvalue problem, Orr-Sommerfeld equation

中图分类号:

Ying TAN, Weidong SU. A trigonometric series expansion method for the Orr-Sommerfeld equation[J]. Applied Mathematics and Mechanics (English Edition), 2019, 40(6): 877-888.

参考文献

[1] THOMAS, L. H. The stability of plane Poiseuille flow. Physical Review, 91(4), 780-783(1953)
[2] DOLPH, C. L. and LEWIS, D. C. On the application of infinite systems of ordinary differential equations to perturbations of plane Poiseuille flow. Quarterly of Applied Mathematics, 16(2), 97-110(1958)
[3] GALLAGHER, A. P. and MERCER, A. M. On the behaviour of small disturbances in plane Couette flow. Journal of Fluid Mechanics, 13(1), 91-100(1962)
[4] GROSCH, C. E. and SALWEN, H. The stability of steady and time-dependent plane Poiseuille flow. Journal of Fluid Mechanics, 34(1), 177-205(1968)
[5] ORSZAG, S. A. Accurate solution of the Orr-Sommerfeld stability equation. Journal of Fluid Mechanics, 50(4), 689-703(1971)
[6] HERBERT, T. Analysis of the subharmonic route to transition in boundary layers. 22nd Aerospace Sciences Meeting, American Institute of Aeronautics and Astronautics, New York (1984)
[7] ZHOU, H. and ZHAO, G. F. Hydrodynamic Stability (in Chinese), National Defence Industrial Press, Beijing (2004)
[8] LANCZOS, C. Applied Analysis, Prentice Hall, Englewood Cliffs (1956)
[9] GAD-EL-HAK, M. The fluid mechanics of microdevices-the freeman scholar lecture. Journal of Fluids Engineering, 121(1), 5-33(1999)
[10] QIAN, T., WANG, X. P., and SHENG, P. A variational approach to the moving contact line hydrodynamics. Journal of Fluid Mechanics, 564, 333-360(2006)
[11] HE, Q. and WANG, X. P. The effect of the boundary slip on the stability of shear flow. Zeitschrift für Angewandte Mathematik und Mechanik, 88(9), 729-734(2008)
[12] SCHMID, P. J. and HENNINGSON, D. S. Stability and Transition in Shear Flows, Springer, New York (2001)
[13] MALIK, M. R. Numerical method for hypersonic boundary layer stability. Journal of Computational Physics, 86, 376-413(1990)
[14] ANTAR, B. N. The eigenvalue spectrum of the Orr-Sommerfeld problem. NASA STI/Recon Technical Report N, 77N11344, NASA, Washington, D. C. (1976)
[15] JONDINSON, R. The flat plate boundary layer, part 1, numerical integration of the OrrSommerfeld equation. Journal of Fluid Mechanics, 43(4), 801-811(1970)

A trigonometric series expansion method for the Orr-Sommerfeld equation

A trigonometric series expansion method for the Orr-Sommerfeld equation

PDF

可视化

摘要/Abstract

引用本文

使用本文

参考文献

相关文章 15

编辑推荐

Metrics

本文评价

[1]	P. Z. S. PAZ, F. R. CUNHA, Y. D. SOBRAL. Stability of plane-parallel flow of magnetic fluids under external magnetic flelds[J]. Applied Mathematics and Mechanics (English Edition), 2022, 43(2): 295-310.
[2]	Zhonggui YI, Baozeng YUE, Mingle DENG. Chebyshev spectral variational integrator and applications[J]. Applied Mathematics and Mechanics (English Edition), 2020, 41(5): 753-768.
[3]	Xinsheng GE, Qijia YAO, Liqun CHEN. Control strategy of optimal deployment for spacecraft solar array system with initial state uncertainty[J]. Applied Mathematics and Mechanics (English Edition), 2018, 39(10): 1437-1452.
[4]	Xinsheng GE, Zhonggui YI, Liqun CHEN. Optimal control of attitude for coupled-rigid-body spacecraft via Chebyshev-Gauss pseudospectral method[J]. Applied Mathematics and Mechanics (English Edition), 2017, 38(9): 1257-1272.
[5]	Chunbao XIONG, Yanbo NIU. Fractional-order generalized thermoelastic diffusion theory[J]. Applied Mathematics and Mechanics (English Edition), 2017, 38(8): 1091-1108.
[6]	Benwen LI, Shangshang CHEN. Direct spectral domain decomposition method for 2D incompressible Navier-Stokes equations[J]. Applied Mathematics and Mechanics (English Edition), 2015, 36(8): 1073-1090.
[7]	Zhijie SHI, Yuesheng WANG, Chuanzeng ZHANG. Band structure calculations of in-plane waves in two-dimensional phononic crystals based on generalized multipole technique[J]. Applied Mathematics and Mechanics (English Edition), 2015, 36(5): 557-580.
[8]	Xu HUANG, Ye YAN, Yang ZHOU, Hua ZHANG. Pseudospectral method for optimal propellantless rendezvous using geomagnetic Lorentz force[J]. Applied Mathematics and Mechanics (English Edition), 2015, 36(5): 609-618.
[9]	高军;罗纪生. Mode decomposition of nonlinear eigenvalue problems and application in flow stability[J]. Applied Mathematics and Mechanics (English Edition), 2014, 35(6): 667-674.
[10]	史志杰汪越胜张传增. Band structure calculation of scalar waves in two-dimensional phononic crystals based on generalized multipole technique[J]. Applied Mathematics and Mechanics (English Edition), 2013, 34(9): 1123-1144.
[11]	I. A. HASSANIEN;H. M. EL-HAWARY;M. A. A. MAHMOUD;R. G. ABDEL-RAHMAN;A. S. Thermal radiation effect on flow and heat transfer of unsteady MHD micropolar fluid over vertical heated nonisothermal stretching surface using group analysis[J]. Applied Mathematics and Mechanics (English Edition), 2013, 34(6): 703-720.
[12]	A. A. AFIFY N. S. ELGAZERY. Effect of double dispersion on non-Darcy mixed convective flow over vertical surface embedded in porous medium[J]. Applied Mathematics and Mechanics (English Edition), 2013, 34(10): 1247-1262.
[13]	M. A. A. MAHMOUD;S. E. WAHEED. Variable fluid properties and thermal radiation effects on flow and heat transfer in micropolar fluid film past moving permeable infinite flat plate with slip velocity[J]. Applied Mathematics and Mechanics (English Edition), 2012, 33(5): 663-678.
[14]	黄鹏展;何银年;冯新龙. Two-level stabilized finite element method for Stokes eigenvalue problem[J]. Applied Mathematics and Mechanics (English Edition), 2012, 33(5): 621-630.
[15]	N. ASHRAFI;H. KARIMI-HAGHIGHI. Improved nonlinear fluid model in rotating flow[J]. Applied Mathematics and Mechanics (English Edition), 2012, 33(11): 1419-1430.