Convective Flow of Non-homogeneous Fluid Conveying Nano-Sized Particles with Non-Fourier Thermal Relaxation: Application in Polymer Coating
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[1] O. Bég,et al. Finite difference computation of free magneto-convective Powell-Eyring nanofluid flow over a permeable cylinder with variable thermal conductivity , 2020, Physica Scripta.
[2] I. L. Animasaun,et al. Meta-analysis on thermo-migration of tiny/nano-sized particles in the motion of various fluids , 2020 .
[3] B. Mahanthesh,et al. Two‐phase Sakiadis flow of a nanoliquid with nonlinear Boussinesq approximation and Brownian motion past a vertical plate: Koo‐Kleinstreuer‐Li model , 2020, Heat Transfer.
[4] B. Mahanthesh,et al. Heat transport and stagnation‐point flow of magnetized nanoliquid with variable thermal conductivity, Brownian moment, and thermophoresis aspects , 2020, Heat Transfer.
[5] R. Singh,et al. Simultaneous effects of nonlinear thermal radiation and Joule heating on the flow of Williamson nanofluid with entropy generation , 2020 .
[6] O. Bég,et al. Entropy generation of tangent hyperbolic nanofluid flow over a circular cylinder in the presence of nonlinear Boussinesq approximation: a non-similar solution , 2020, Journal of Thermal Analysis and Calorimetry.
[7] A. Ray,et al. Free convective heat transfer in Jeffrey fluid with suspended nanoparticles and Cattaneo–Christov heat flux , 2020 .
[8] O. Anwar Bég,et al. Computational fluid dynamic simulation of two-fluid non-Newtonian nanohemodynamics through a diseased artery with a stenosis and aneurysm , 2020, Computer methods in biomechanics and biomedical engineering.
[9] P. V. S. N. Murthy,et al. Non-similar Solution of Eyring–Powell Fluid Flow and Heat Transfer with Convective Boundary Condition: Homotopy Analysis Method , 2020 .
[10] A. Ray,et al. Influence of chemically radiative nanoparticles on flow of Maxwell electrically conducting fluid over a convectively heated exponential stretching sheet , 2019 .
[11] O. Bég,et al. Finite element analysis of non-Newtonian magnetohemodynamic flow conveying nanoparticles through a stenosed coronary artery , 2019, Heat Transfer-Asian Research.
[12] O. Anwar Bég,et al. Homotopy Semi-Numerical Modeling of Non-Newtonian Nanofluid Transport External to Multiple Geometries Using a Revised Buongiorno Model , 2019, Inventions.
[13] B. Mahanthesh,et al. A meta-analysis on the effects of haphazard motion of tiny/nano-sized particles on the dynamics and other physical properties of some fluids , 2019, Chinese Journal of Physics.
[14] R. Gorla,et al. Homotopy Simulation of Non-Newtonian Spriggs Fluid Flow Over a Flat Plate with Oscillating Motion , 2019, International Journal of Applied Mechanics and Engineering.
[15] O. Bég,et al. Mathematical modelling of ciliary propulsion of an electrically-conducting Johnson-Segalman physiological fluid in a channel with slip , 2019, Computer methods in biomechanics and biomedical engineering.
[16] O. Bég,et al. Supercritical heat transfer characteristics of couple stress convection flow from a vertical cylinder using an equation of state approach , 2019, Journal of Molecular Liquids.
[17] O. Bég,et al. Homotopy study of magnetohydrodynamic mixed convection nanofluid multiple slip flow and heat transfer from a vertical cylinder with entropy generation , 2019, Propulsion and Power Research.
[18] B. Vasu,et al. Numerical study of Carreau nanofluid flow past vertical plate with the Cattaneo–Christov heat flux model , 2019, International Journal of Numerical Methods for Heat & Fluid Flow.
[19] O. Anwar Bég,et al. Computational study of heat transfer in solar collectors with different radiative flux models , 2019, Heat Transfer-Asian Research.
[20] O. Anwar Bég,et al. Numerical Study of Viscoelastic Micropolar Heat Transfer from a Vertical Cone for Thermal Polymer Coating , 2019, Nonlinear Engineering.
[21] O. Anwar Bég,et al. Numerical study of chemical reaction effects in magnetohydrodynamic Oldroyd-B: oblique stagnation flow with a non-Fourier heat flux model , 2018, Journal of the Brazilian Society of Mechanical Sciences and Engineering.
[22] O. Koriko,et al. On the Motion of Non-Newtonian Eyring–Powell Fluid Conveying Tiny Gold Particles Due to Generalized Surface Slip Velocity and Buoyancy , 2018, International Journal of Applied and Computational Mathematics.
[23] O. Koriko,et al. Comparative analysis between 36 nm and 47 nm alumina–water nanofluid flows in the presence of Hall effect , 2018, Journal of Thermal Analysis and Calorimetry.
[24] O. Anwar Bég,et al. Exact analysis of heat convection of viscoelastic FENE-P fluids through isothermal slits and tubes , 2018 .
[25] I. L. Animasaun,et al. Insight into the boundary layer flow of non-Newtonian Eyring-Powell fluid due to catalytic surface reaction on an upper horizontal surface of a paraboloid of revolution , 2017, Alexandria Engineering Journal.
[26] S. Jangili,et al. HOMOTOPY STUDY OF ENTROPY GENERATION IN MAGNETIZED MICROPOLAR FLOW IN A VERTICAL PARALLEL PLATE CHANNEL WITH BUOYANCY EFFECT , 2018 .
[27] A. Ray,et al. Hydrodynamics of Non-Newtonian Spriggs Fluid Flow Past an Impulsively Moving Plate , 2018 .
[28] M. M. Bhatti,et al. Numerical study of radiative Maxwell viscoelastic magnetized flow from a stretching permeable sheet with the Cattaneo–Christov heat flux model , 2018, Neural Computing and Applications.
[29] P. K. Kundu,et al. Exploring the Cattaneo-Christov heat flux phenomenon on a Maxwell-type nanofluid coexisting with homogeneous/heterogeneous reactions , 2017 .
[30] P. Murthy,et al. Entropy Generation Analysis in Nonlinear Convection Flow of Thermally Stratified Fluid in Saturated Porous Medium With Convective Boundary Condition , 2017 .
[31] O. Anwar Bég,et al. Magneto-nanofluid flow with heat transfer past a stretching surface for the new heat flux model using numerical approach , 2017 .
[32] P. Murthy,et al. Thermophoresis on boundary layer heat and mass transfer flow of Walters-B fluid past a radiate plate with heat sink/source , 2017 .
[33] O. Bég,et al. Heat transfer in viscoplastic boundary layer flow from a vertical permeable cone with momentum and thermal wall slip : numerical study , 2017 .
[34] P. K. Kameswaran,et al. Mixed convection from a wavy surface embedded in a thermally stratified nanofluid saturated porous medium with non-linear Boussinesq approximation , 2016 .
[35] T. Hayat,et al. Mathematical Model for Isothermal Wire-Coating From a Bath of Giesekus Viscoelastic Fluid , 2016 .
[36] O. Bég,et al. Homotopy Simulation of Nonlinear Unsteady Rotating Nanofluid Flow from a Spinning Body , 2015 .
[37] O. Bég,et al. PERISTALTIC TRANSPORT OF MAXWELL VISCOELASTIC FLUIDS WITH A SLIP CONDITION: HOMOTOPY ANALYSIS OF GASTRIC TRANSPORT , 2015 .
[38] O. Anwar Bég,et al. Heat Transfer in a Casson Rheological Fluid from a Semi-infinite Vertical Plate with Partial Slip , 2015 .
[39] N. Ganesh,et al. Magnetic field effect on second order slip flow of nanofluid over a stretching/shrinking sheet with thermal radiation effect , 2015 .
[40] S. Arabia,et al. Heat Treatment of Polymers: A Review , 2015 .
[41] Davood Domiri Ganji,et al. Brownian motion and thermophoresis effects on slip flow of alumina/water nanofluid inside a circular microchannel in the presence of a magnetic field , 2014 .
[42] Ali J. Chamkha,et al. Non-similar solutions for mixed convection along a wedge embedded in a porous medium saturated by a non-Newtonian nanofluid : Natural convection dominated regime , 2014 .
[43] Donald A. Nield,et al. Natural convective boundary-layer flow of a nanofluid past a vertical plate: A revised model , 2014 .
[44] O. Bég,et al. FINITE-ELEMENT ANALYSIS OF TRANSIENT HEAT AND MASS TRANSFER IN MICROSTRUCTURAL BOUNDARY LAYER FLOW FROM A POROUS STRETCHING SHEET , 2014 .
[45] Fridtjov Irgens,et al. Rheology and Non-Newtonian Fluids , 2013 .
[46] S. Ghosh,et al. Numerical Modelling of Non-similar Mixed Convection Heat and Species Transfer along an Inclined Solar Energy Collector Surface with Cross Diffusion Effects , 2011 .
[47] O. Makinde,et al. Viscoelastic flow and species transfer in a Darcian high-permeability channel , 2011 .
[48] N. C. Roy,et al. Numerical solution of a steady natural convection flow from a vertical plate with the combined effects of streamwise temperature and species concentration variations , 2010 .
[49] O. Bég,et al. Numerical study of free convection magnetohydrodynamic heat and mass transfer from a stretching surface to a saturated porous medium with Soret and Dufour effects , 2009 .
[50] J. Fourier. Théorie analytique de la chaleur , 2009 .
[51] Christo I. Christov,et al. On frame indifferent formulation of the Maxwell-Cattaneo model of finite-speed heat conduction , 2009 .
[52] S. Asghar,et al. Mixed convection flow of second grade fluid along a vertical stretching flat surface with variable surface temperature , 2007 .
[53] J. Buongiorno. Convective Transport in Nanofluids , 2006 .
[54] S. Liao,et al. Beyond Perturbation: Introduction to the Homotopy Analysis Method , 2003 .
[55] M. Massoudi. Local non-similarity solutions for the flow of a non-Newtonian fluid over a wedge , 2001 .
[56] R. Viskanta. RADIATION HEAT TRANSFER IN MATERIALS PROCESSING AND MANUFACTURING , 1999 .
[57] H. Takhar,et al. Mixed convection in non‐Newtonian fluids along a vertical plate in porous media with surface mass transfer , 1997 .
[58] Dennis J. Coyle,et al. Knife and Roll Coating , 1997 .
[59] Y. Chou,et al. Effects of Prandtl Number on Free Convection Heat Transfer From a Vertical Plate to a Non-Newtonian Fluid , 1989 .
[60] K. Rajagopal,et al. Natural convection flow of a non-Newtonian fluid between two vertical flat plates , 1985 .
[61] J. Pearson,et al. Mechanics of polymer processing , 1985 .
[62] M. F. Edwards,et al. A semi-empirical model of the forward roll coating flow of newtonian fluids , 1981 .
[63] E. Sparrow,et al. Numerical Solution Scheme for Local Nonsimilarity Boundary-Layer Analysis , 1978 .
[64] E. Sparrow,et al. Local non- similarity thermal boundary- layer solutions , 1971 .
[65] D. D. Eley,et al. Mechanisms for the Relaxation Theory of Viscosity , 1944, Nature.