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Peristaltic flow of Johnson-Segalman fluid in asymmetric channel with convective boundary conditions 被引量:1

Peristaltic flow of Johnson-Segalman fluid in asymmetric channel with convective boundary conditions
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摘要 This work is concerned with the peristaltic transport of the Johnson-Segalman fluid in an asymmetric channel with convective boundary conditions. The mathematical modeling is based upon the conservation laws of mass, linear momentum, and energy. The resulting equations are solved after long wavelength and low Reynolds number are used. The results for the axial pressure gradient, velocity, and temperature profiles are obtained for small Weissenberg number. The expressions of the pressure gra-dient, velocity, and temperature are analyzed for various embedded parameters. Pumping and trapping phenomena are also explored. This work is concerned with the peristaltic transport of the Johnson-Segalman fluid in an asymmetric channel with convective boundary conditions. The mathematical modeling is based upon the conservation laws of mass, linear momentum, and energy. The resulting equations are solved after long wavelength and low Reynolds number are used. The results for the axial pressure gradient, velocity, and temperature profiles are obtained for small Weissenberg number. The expressions of the pressure gra-dient, velocity, and temperature are analyzed for various embedded parameters. Pumping and trapping phenomena are also explored.
出处 《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2014年第6期697-716,共20页 应用数学和力学(英文版)
关键词 asymmetric channel convective condition pumping and trapping Johnson-Segalman fluid asymmetric channel, convective condition, pumping and trapping, Johnson-Segalman fluid
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  • 1Truesdell, C. and Noll, W. The non-linear field theories of mechanics. Encyclopedia of Physics, Springer, Berlin, 1-591 (1965).
  • 2Rajagopal, K. R. On boundary conditions for fluids of the differential type. Navier-Stokes Equations and Related Non-Linear Problems, Plenum Press, New York, 273-278 (1995).
  • 3Rajagopal, K. R. and Kaloni, P. N. Some remarks on boundary conditions for fluids of the differ-ential type. Continuum Mechanics and Its Applications, Hemisphere, New York, 935-942 (1989).
  • 4Rajagopal, K. R. and Gupta, A. S. An exact solution for the flow of a non-Newtonian fluid past an infinite plate. Mechanica, 19, 158-160 (1984).
  • 5Hayat, T., Masood, K., Siddiqui, A. M., and Asghar, S. Transient flows of a second grade fluid. International Journal of Non-Linear Mechanics, 39, 1621-1633 (2004).
  • 6Fetecau, C., Fetecau, C., Jamil, M., and Mahmood, A. Flow of fractional Maxwell fluid between coaxial cylinders. Archive of Applied Mechanics, 81, 1153-1163 (2011).
  • 7Fetecau, C., Mahmood, A., and Jamil, M. Exact solutions for the flow of a viscoelastic fluid induced by a circular cylinder subject to a time dependent shear stress. Communications in Nonlinear Science and Numerical Simulation, 15, 3931-3938 (2010).
  • 8Tan, W. C. and Masuoka, T. Stokes' first problem for second grade fluid in a porous half space. International Journal of Non-Linear Mechanics, 40, 515-522 (2005).
  • 9Rashidi, M. M., Mohimanian-Pour, S. A., and Laraqi, N. A semi-analytical solution of micropolar flow in a porous channel with mass injection by using differential transform method. Nonlinear Analysis: Modelling and Control, 15, 341-350 (2010).
  • 10Ellahi, R., Riaz, A., Nadeem, S., and Ali, M. Peristaltic flow of Carreau fluid in a rectangular duct through a porous medium. Mathematical Problems in Engineering, 2012, 329639 (2012).

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