Abstract:
Inspired by the varying applications of non-Newtonian fluids, we completed our numerical computation for multiple solutions near by the stagnation point flow of Carreau viscosity model past a shrinking sheet with infinite shear rate viscosity. Heat transfer is inspected allowing for non-Fourier heat flux and thermal stratification. Energy and concentration equations are developed with the help of theory of Cattaneo-Christov double diffusion. Such diffusions are established as a part of expressing the solutal and thermal relaxation times framework. The emerging leading non-linear equations have been solved numerically by means of Runge-Kutta Fhelberg method. The obtained numerical results have been displayed graphically and some exciting features like multiple solutions are established. The critical values are computed for the suction and shrinking parameters. Moreover the critical values have been attained by using the plots of reduced skin friction. This study discloses that the multiple solutions occur for the different essential physical parameters for example suction parameter s, shrinking parameter ?, magnetic parameter M, Prandtl number Pr, velocity slip parameter d, viscosity ratio parameter ß*, Schmidt number Sc, non-dimensional thermal relaxation time de and non-dimensional solutal relaxation time δc.
Page(s):
0-0
DOI:
DOI not available
Published:
Journal: First International Conference on Revamped Scientific Outlook of 21st Century (Abstract Book), Volume: 0, Issue: 0, Year: 2022
Keywords:
Carreau Fluid
,
RungeKutta Fhelberg Method
,
Shrinking Sheet
,
CattaneoChristov Double Diffusion