Numerical solution to the Falkner-Skan equation:a novel numerical approach through the new rational α-polynomials
摘要
The new rationalα-polynomials are used to solve the Falkner-Skan equation.These polynomials are equipped with an auxiliary parameter.The approximated solution to the Falkner-Skan equation is obtained by the new rational a-polynomials with unknown coefficients.To find the unknown coefficients and the auxiliary parameter contained in the polynomials,the collocation method with Chebyshev-Gauss points is used.The numerical examples show the efficiency of this method.
参考文献3
-
1章骥,方铁钢,钟永芳,黄锋(译 ),张禄坤(校).精确的磁流体动力学汇流解析解[J].应用数学和力学,2011,32(10):1139-1147. 被引量:1
-
2苏晓红,郑连存.Approximate solutions to MHD Falkner-Skan flow over permeable wall[J].Applied Mathematics and Mechanics(English Edition),2011,32(4):401-408. 被引量:2
-
3S.ABBASBANDY,T.HAYAT,H.R.GHEHSAREH,A.ALSAEDI.MHD Falkner-Skan flow of Maxwell fluid by rational Chebyshev collocation method[J].Applied Mathematics and Mechanics(English Edition),2013,34(8):921-930. 被引量:1
二级参考文献63
-
1Soundalgekar V M, Takhar H S, Singh M. Velocity and temperature field in MHD Falkner- Skan flow[J]. Journal of the Physical Society of Japan, 1981, 50: 3139-3143.
-
2Abbasbandy S, Hayat T. Solution of the MHD Falkner-Skan flow by Hankel-Pade method[ J].Physics Letters A, 2009, 373(7): 731-734.
-
3Abbasbandy S, Hayat T. Solution of the MHD Falkner-Skan flow by homotopy analysis method [J].Communications in Nonlinear Science and Numerical Simulation, 2009, 14 ( 9/10 ) : 3591-3598.
-
4Ishak A, Nazar R, Pop I. MHD boundary-layer flow past a moving wedge[ J]. Magnetohydrodynamics, 2009, 45(1) : 103-110.
-
5Schlichting H, Gersten K. Boundary Layer Theory[ M]. 8th Revised and Enlarged Edition. Springer, 2000: 171-174.
-
6Pohlhausen K. Zur nahenmgsweisen integration der differentialgleichung der laminaren grenzschicht[J]. J Appl Math Mech ( ZAMM) , 1921,1(4) : 252-268.
-
7Falkner V M, Skan S W. Some approximate solutions of the boundary layer equations [ J ]. Phil Mag, 1931, 12: 855-895.
-
8Hartree D R. On an equation occurring in Falkner and Skan' s approximate treatment of the equations of the boundary layer[ J]. Proc of the Cambridge Philosophical Society, 1937, 33 (2) : 223-239.
-
9Weyl H. On the differential equation of the simplest boundary-layer problems [ J ]. Ann of Math, 1942, 43: 381-407.
-
10Rosehead L. Laminar Boundary Layers[M]. London: Oxford University Press, 1963.
-
1ZHANG Ran,Murat Sat,YANG Chuan-fu.Inverse nodal problem for the Sturm-Liouville operator with a weight[J].Applied Mathematics(A Journal of Chinese Universities),2020,35(2):193-202.
-
2Glenio A.Goncalves,Regis S.de Quadros,Daniela Buske.An Analytical Formulation for Pollutant Dispersion Simulation in the Atmospheric Boundary Layer[J].Journal of Environmental Protection,2013,4(8):57-64.
-
3肖岚.一种船舶企业经济效益的评价方法[J].武汉船舶职业技术学院学报,2020,19(4):145-148. 被引量:1
-
4Shuangbing Guo,Dingfang Li,Hui Feng,Xiliang Lu.Extremal Eigenvalues of the Sturm-Liouville Problems with Discontinuous Coefficients[J].Numerical Mathematics(Theory,Methods and Applications),2013,6(4):657-684.
-
5Ahmed Khidir.A note on the solution of general Falkner-Skan problem by two novel semi-analytical techniques[J].Propulsion and Power Research,2015,4(4):212-220.
-
6Wafaa Alharbi,Abdulrahman Aljohani,Essam El-Zahar,Abdelhalim Ebaid.Exact Solution of Non-Newtonian Blood Flow with Nanoparticles through Porous Arteries:A Comparative Study[J].Computers, Materials & Continua,2020(6):1143-1157.
-
7Maryam Khazaei,Yeganeh Karamipour.Numerical Solution of the Seventh Order Boundary Value Problems Using B-Spline Method[J].Journal of Applied Mathematics and Physics,2021,9(12):3058-3066.
-
8Chuan-fu YANG,Feng WANG,Zhen-you HUANG.Ambarzumyan Theorems for Dirac Operators[J].Acta Mathematicae Applicatae Sinica,2021,37(2):287-298.
-
9M.H.T.Alshbool,W.Shatanawi,I.Hashim,M.Sarr.Residual Correction Procedure with Bernstein Polynomials for Solving Important Systems of Ordinary Differential Equations[J].Computers, Materials & Continua,2020(7):63-80.
-
10倪佳.关于高斯对代数基本定理第三次证明的一种简化证明[J].科学咨询,2021(49):53-55.
