No data available.
Please log in to see this content.
You have no subscription access to this content.
No metrics data to plot.
The attempt to load metrics for this article has failed.
The attempt to plot a graph for these metrics has failed.
Stokes’ first problem for an Oldroyd-B fluid in a porous half space
1.H. Schlichting and K. Gersten, Boundary Layer Theory, 8th ed. (Springer, Berlin, 2000).
2.I. Taipel, “The impulsive motion of a flat plate in a viscoelasitic fluid,” Acta Mech. 39, 277 (1981).
3.J. A. Morrison, “Wave propagation in rods of Voigt material and viscoelastic material with three parameter models,” Q. J. Mech. Appl. Math. 14, 153 (1956).
4.R. R. Huilgol, “Correction and extensions to Propagation of vortex sheet in viscoelastic liquids-The Rayleigh problem,” J. Non-Newtonian Fluid Mech. 12, 249 (1983).
5.R. Tanner, “Notes on the Rayleigh parallel problem for a viscoelastic fluid,” ZAMP 13, 573 (1962).
6.L. Preziosi and D. D. Joseph, “Stokes first problem for viscoelastic fluids,” J. Non-Newtonian Fluid Mech. 25, 239 (1987).
7.N. Phan-Thien and Y. T. Chew, “On the Rayleigh problem for a viscoelastic fluid,” J. Non-Newtonian Fluid Mech. 28, 117 (1988).
8.R. Bandelli and K. R. Rajagopal, “Start-up flows of second grade fluids in domains with one finite dimension,” Int. J. Non-Linear Mech. 30, 817 (1995).
9.P. Luchini and A. Bottaro, “Linear stability and receptivity analyses of the Stokes layer produced by an impulsively started plate,” Phys. Fluids 13, 1668 (2001).
10.C. Fetecau and C. Fetecau, “The Rayleigh-Stokes problem for heated second grade fluids,” Int. J. Non-Linear Mech. 37, 1011 (2002).
11.W. C. Tan and M. Y. Xu, “The impulsive motion of flat plate in a general second grade fluid,” Mech. Res. Commun. 29, 3 (2002).
12.W. C. Tan and M. Y. Xu, “Plane surface suddenly set in motion in a viscoelasticfluid with fractional Maxwell model,” Acta Mech. Sin. 18, 342 (2002).
13.A. Lozinski and R. G. Owens, “An energy estimate for the Oldroyd-B model: theory and applications,” J. Non-Newtonian Fluid Mech. 112, 161 (2003).
14.T. N. Phillips and A. J. Williams, “Comparison of creeping and inertial flow of an Oldroyd-B fluid through planar and axisymmetric contractions,” J. Non-Newtonian Fluid Mech. 108, 25 (2002).
17.K. R. Rajagopal and R. K. Bhatnagar, “Exact solutions for some simple flows of an Oldroyd-B fluid,” Acta Mech. 113, 233 (1995).
18.T. Hayat, A. M. Siddiqui, and S. Asghar, “Some simple flows of an Oldroyd-B fluid,” Int. J. Eng. Sci. 39, 135 (2001).
19.C. Fetecau and C. Fetecau, “The first problem of Stokes for an Oldroyd-B fluid,” Int. J. Non-Linear Mech. 38, 1539 (2003).
20.Y. Anis, “On modeling the multidimensional coupled fluid flow and heat or mass transport in porous media,” Int. J. Heat Mass Transfer 46, 367 (2003).
21.D. A. Nield and B. Adrian, Convection in Porous Media, 2nd ed. (Springer, Berlin, 1999).
22.B. Khuzhayorov, J. L. Auriault, and P. Royer, “Derivation of macroscopic filtration law for transient linear viscoelastic fluid flow in porous media,” Int. J. Eng. Sci. 38, 487 (2000).
23.A. R. A. Khaled and K. Vafai, “The role of porous media in modeling flow and heat transfer in biological tissues,” Int. J. Heat Mass Transfer 46, 4989 (2003).
24.P. M. Jordan and P. Puri, “Stokes’ first problem for a Rivlin-Ericksen fluid of second grade in a porous half-space,” Int. J. Non-Linear Mech. 38, 1019 (2003).
26.A. R. A. Khaled and K. Vafai, “The role of porous media in modeling flow and heat transfer in biological tissues,” Int. J. Heat Mass Transfer 46, 4989 (2003).
27.M. C. Kim, S. B. Lee, S. Kim et al., “Thermal instability of viscoelastic fluids in porous media,” Int. J. Heat Mass Transfer 46, 5065 (2003).
28.K. Vafai and C. L. Tien, “Boundary and inertia effects on flow and heat transfer in porous media,” Int. J. Heat Mass Transfer 24, 195 (1981).
29.J. C. Slattery, Advanced Transport Phenomena (Cambridge University Press, Cambridge, 1999).
30.T. Masuoka and Y. Takatsu, in Turbulence Characteristics in Porous Media, Transport Phenomena in Porous Media Vol. II, edited by B. I. Derek and I. Pop (Elsevier Sci. Ltd, Boston, 2002), pp. 231–256.
31.C. Fetecau and C. Fetecau, “A new exact solution for the flow of a Maxwell fluid past an infinite plate,” Int. J. Non-Linear Mech. 38, 423 (2003).
Article metrics loading...
Full text loading...
Most read this month