Boundary layer theory for second order fluids
作者: M. Pakdemirli , E.S. Şuhubi
DOI: 10.1016/0020-7225(92)90042-F
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摘要: Abstract Two-dimensional equations of steady motion for second order fluids are expressed in a special coordinate system generated by the potential flow corresponding to an inviscid fluid. For around arbitrary object φ coordinates streamlines, ψ velocity lines. It is clear that so derived and boundary conditions become sense independent body shape immersed into flow. Using usual layer assumptions then deduced from employing technique matched asymptotic expansion.
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sci-hub.se 参考文章(5)
Saul Kaplun, The role of coordinate systems in boundary-layer theory Zeitschrift für Angewandte Mathematik und Physik. ,vol. 5, pp. 111- 135 ,(1954) , 10.1007/BF01600771
A.C. Srivastava, M.S. Saroa, Phenomenon of separation in second-order fluids International Journal of Non-Linear Mechanics. ,vol. 6, pp. 607- 614 ,(1971) , 10.1016/0020-7462(71)90023-0
J. Ernest Dunn, Roger L. Fosdick, Thermodynamics, stability, and boundedness of fluids of complexity 2 and fluids of second grade Archive for Rational Mechanics and Analysis. ,vol. 56, pp. 191- 252 ,(1974) , 10.1007/BF00280970
Bernard D. Coleman, Walter Noll, An Approximation Theorem for Functionals, with Applications in Continuum Mechanics Archive for Rational Mechanics and Analysis. ,vol. 6, pp. 355- 370 ,(1960) , 10.1007/BF00276168
Lawrence E. Levine, Julian D. Cole, Perturbation Methods in Applied Mathematics ,(1985)