RT Journal Article ID 6261a2cb446cdcdd A1 RamReddy, Chetteti A1 Naveen, Padigepati A1 Srinivasacharya, Darbhasayanam T1 EFFECTS OF NONLINEAR CONVECTION AND CROSS-DIFFUSION FOR THE FLOW OF DARCY-FORCHHEIMER MODEL MICROPOLAR FLUID WITH CONVECTIVE BOUNDARY CONDITION JF Computational Thermal Sciences: An International Journal JO CTS YR 2019 FD 2018-11-20 VO 11 IS 3 SP 205 OP 218 K1 nonlinear convection K1 convective boundary condition K1 non-Darcy porous medium K1 micropolar fluid K1 successive linearization method K1 cross-diffusion effects AB In this article, the collective influence of nonlinear convection and cross-diffusion effects is studied in non-Darcian micropolar fluid flow over an inclined plate with convective thermal boundary condition. The governing equations of the physical model are cast into a sequence of ordinary differential equations by the local nonsimilarity transformation technique. The transformed set of equations is solved numerically by applying a successive linearization method. This significant study addresses the influence of various pertinent parameters on the fluid characteristics and the solutions are discussed through graphs. The influence of the nonlinear density-concentration parameter is additionally outstanding on all the physical characteristics of the present model compared to the nonlinear density-temperature parameter. The cross-diffusion coefficients (Soret and Dufour numbers) have opposite influences on Nusselt and Sherwood numbers. Applications of the present study arise in aerosol technology, space technology, astrophysics, and geophysics, which are related to temperature-concentration-dependent density. PB Begell House LK https://www.dl.begellhouse.com/journals/648192910890cd0e,6a05a6167690f470,6261a2cb446cdcdd.html