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Some singular, nonlinear differential equations arising in boundary layer theory. (English) Zbl 0386.34026

MSC:
34B15 Nonlinear boundary value problems for ordinary differential equations
76D10 Boundary-layer theory, separation and reattachment, higher-order effects
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[1] Ackroyd, J.A.D, On the laminar compressible boundary layer with stationary origin on a moving flat wall, (), 871-888 · Zbl 0166.45804
[2] Callegari, A; Friedman, M.B, An analytical solution of a nonlinear, singular boundary value problem in the theory of viscous fluids, J. math. anal. appl., 21, 510-529, (1968) · Zbl 0172.26802
[3] Hsu, C, Boundary layer growth behind a plane wave, Aiaa j., 7, 1810-1811, (1969) · Zbl 0193.26501
[4] Mirels, H, Laminar boundary layer behind a shock advancing in a stationary fluid, () · Zbl 0083.41503
[5] Mirels, H, Boundary layer behind a shock or thin expansion wave moving into a stationary fluid, () · Zbl 0083.41503
[6] Thompson, P.A, Compressible-fluid dynamics, (), 502-514
[7] Wong, J.S.W, On the generalized Emden-Fowler equation, SIAM rev., 17, 339-369, (1975) · Zbl 0295.34026
[8] \scA. Callegari and M. B. Friedman, The boundary layer blow-off problem, submitted for publication.
[9] Klemp, J.B; Acrivos, A, A moving-wall boundary layer with reverse flow, J. fluid mech., 76, 363-381, (1976), part 2 · Zbl 0344.76026
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