Premium
Soret and Dufour effects on MHD flow of viscoelastic fluid past an infinite vertical stretching sheet
Author(s) -
Siva Kumar Reddy B.,
Surya Narayana Rao K. V.,
Vijaya R. Bhuvana
Publication year - 2020
Publication title -
heat transfer
Language(s) - English
Resource type - Journals
eISSN - 2688-4542
pISSN - 2688-4534
DOI - 10.1002/htj.21723
Subject(s) - magnetohydrodynamics , buoyancy , homotopy analysis method , mechanics , thermophoresis , partial differential equation , viscosity , flow (mathematics) , momentum (technical analysis) , classical mechanics , fluid dynamics , nonlinear system , matrix similarity , physics , homotopy , thermodynamics , mathematical analysis , mathematics , heat transfer , nanofluid , magnetic field , finance , quantum mechanics , pure mathematics , economics
Heat and mass transmission taking place in a magnetohydrodynamics fluid of substantial viscosity via a permeable object has been currently a subject of study inviting research. This transmission takes place along an infinite expanding vertical surface showing Soret and Dufour effects. Differential forms of nonlinear nature such as energy, momentum, and equations defining concentration are ascertained by means of similarity transformation with the existing buoyancy force, and by making use of the homotopy analysis method, the equations have been analytically resolved. The impacts arising out of applied factors on temperature, velocity, and concentration forms have been appropriately designed and established.