%0 Journal Article
%A Shah, Rehan Ali
%A Khan, Aamir
%A Shuaib, Muhammad
%D 2018
%I Begell House
%K advection diffusion, Dufour number, Soret number, BVP4c, HAM
%N 4
%P 283-299
%R 10.1615/InterJFluidMechRes.2018019916
%T ON ANALYSIS OF SQUEEZING FLOW BETWEEN ROTATING DISKS WITH CROSS DIFFUSION EFFECTS UNDER THE INFLUENCE OF CORIOLIS AND CENTRIFUGAL FORCES
%U http://dl.begellhouse.com/journals/71cb29ca5b40f8f8,1bafe001282db342,69ab273b3a2f231c.html
%V 45
%X Fluid flow may be modeled by a system of differential equations that accounts for the squeezing and rotation effects and
that are coupled with an advection diffusion and energy equation defining the mass and heat flux going from the lower
to the upper disk. This system of equations is characterized by squeezing number S, Prandtl number Pr, Hartmann number M, radiation parameter Rd, Schmidt parameter Sc, Soret number So, suction/injection parameter A, and Dufour number Du. In the case of smooth disks the self-similar equations are solved using the homotopy analysis method (HAM) with appropriate initial guesses and auxiliary parameters to produce an algorithm with an accelerated and assured convergence. The accuracy of the HAM is proved by comparison of the HAM solution with numerical results obtained by BVP4c. A parametric study is tabulated and discussed with graphical aids.
%8 2018-07-05