Chemical reactive flow of Jeffrey fluid due to a rotating disk with non-Fourier heat flux theory

Abstract

The present paper explores non-Fourier heat flux theory for Jeffrey fluid flow subject to a rotating disk. The current analysis is executed in the presence of homogeneous–heterogeneous reactions. Relevant system of equations is constructed and appropriate transformations lead to self-similar forms. Convergent series solutions are computed for the resulting nonlinear differential system by homotopy analysis method. Graphical illustrations thoroughly demonstrate the features of involved pertinent parameters. Skin friction coefficients are also obtained and discussed graphically. Current computations reveal that the radial velocity experience declines with the decay of Deborah number. Further, fluid temperature declines for higher Prandtl number.