Unsteady flow of fractionalized Jeffrey fluid over a plate is considered. In addition, thermo diffusion and slip effects are also used in the problem. The
flow model is solved using Constant proportional Caputo fractional derivative. Initially, the governing equations are made non-dimensional and then
solved by Laplace transform. From the Figs., it is observed that Prandtl and Smith numbers have decreasing effect on fluid motion, whereas thermodiffusion have increasing effect on fluid motion. Moreover, comparison among fractionalized and ordinary velocity fields is also
drawn.
Cite This Article
APA Style
Shafique
, A., Ramzan, M., Ikram, Z., Amir, M., Nazar, M. (2023). MHD FLOW OF JEFFREY FLUID WITH HEAT ABSORPTION AND THERMO-DIFFUSION. Frontiers in Heat and Mass Transfer, 20(1), 1-10. https://doi.org/10.5098/hmt.20.4
Vancouver Style
Shafique
A, Ramzan M, Ikram Z, Amir M, Nazar M. MHD FLOW OF JEFFREY FLUID WITH HEAT ABSORPTION AND THERMO-DIFFUSION. Frontiers Heat Mass Transfer . 2023;20(1):1-10 https://doi.org/10.5098/hmt.20.4
IEEE Style
A. Shafique
, M. Ramzan, Z. Ikram, M. Amir, and M. Nazar "MHD FLOW OF JEFFREY FLUID WITH HEAT ABSORPTION AND THERMO-DIFFUSION," Frontiers Heat Mass Transfer , vol. 20, no. 1, pp. 1-10. 2023. https://doi.org/10.5098/hmt.20.4