Numerical solution of the equations of motion for flow around objects in channels at low reynolds numbers
作者: S. Whitaker , M. M. Wendel
DOI: 10.1007/BF03184753
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摘要: This paper describes the numerical integration of derived equations motion for flow past an infinite set parallel flat plates placed perpendicular to and between two planes. If distance is greater than channel depths, problem can be reduced dimensions by assuming that major velocity components are parabolic in depth direction. The solution has been compared with experimental data Stokes reasonable agreement was obtained. At Reynolds numbers 10, stability method becomes increasingly troublesome convergence very slow.
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sci-hub.se 参考文章(6)
Hermann Schlichting, Boundary layer theory ,(1955)
Shinji Kuwabara, The Forces experienced by a Lattice of Equal Flat Plates in a Uniform Flow at Small Reynolds Numbers Journal of the Physical Society of Japan. ,vol. 13, pp. 1516- 1523 ,(1958) , 10.1143/JPSJ.13.1516
Stephen Whitaker, R. L. Pigford, An Approach to Numerical Differentiation of Experimental Data Industrial & Engineering Chemistry. ,vol. 52, pp. 185- 187 ,(1960) , 10.1021/IE50602A043
Francis Begnaud Hildebrand, Introduction to numerical analysis International Series in Pure and Applied Mathematics. ,(1974)
A. H. T., Rudolph E. Langer, Boundary Problems in Differential Equations Mathematics of Computation. ,vol. 14, pp. 395- ,(1960) , 10.2307/2003931
A. Blair, N. Metropolis, J. von Neumann, A. H. Taub, M. Tsingou, A Study of a Numerical Solution to a Two-Dimensional Hydrodynamical Problem Mathematical Tables and Other Aids to Computation. ,vol. 13, pp. 145- None ,(1959) , 10.2307/2002710