TY - GEN
T1 - Effects of thermal radiation and stability analysis on MHD stagnation casson fluid flow over the stretching surface with slip velocity
AU - Nayak, M. K.
AU - Mahanta, G.
AU - Karmakar, K.
AU - Mohanty, P.
AU - Shaw, S.
N1 - Publisher Copyright:
© 2022 Author(s).
PY - 2022/3/18
Y1 - 2022/3/18
N2 - This review analyzed the results of slip velocity, thermal radiation, and MHD effects considered near the stagnation point flow over the stretching surface. The heat source parameter and chemical reaction parameter are added in temperature and concentrations equations. The convective heat and mass transfer are adopted in the boundary conditions. The structures of the equations are in the form of momentum, energy, and concentration. The systems of nonlinear forms of PDEs are transformed to ODE's form by applying a suitable similarity transformation. A bvp4c is a powerful software tool for numerical solutions to the present problem. Now, this solution will motivate and suggest the main result for many physical concepts, such as velocity, temperature, and concentrations, and explore its properties through graphs and the skin friction, heat, and mass transfer presented in tabular form. Further, we adopted the stability analysis of the given differential equations along with boundary conditions for a stable solution to the problem. The stability of the differential equations is very much essential for the physical stability of the system. Discussed the results of various non-dimensional parameters and found an excellent match with the comparison tables.
AB - This review analyzed the results of slip velocity, thermal radiation, and MHD effects considered near the stagnation point flow over the stretching surface. The heat source parameter and chemical reaction parameter are added in temperature and concentrations equations. The convective heat and mass transfer are adopted in the boundary conditions. The structures of the equations are in the form of momentum, energy, and concentration. The systems of nonlinear forms of PDEs are transformed to ODE's form by applying a suitable similarity transformation. A bvp4c is a powerful software tool for numerical solutions to the present problem. Now, this solution will motivate and suggest the main result for many physical concepts, such as velocity, temperature, and concentrations, and explore its properties through graphs and the skin friction, heat, and mass transfer presented in tabular form. Further, we adopted the stability analysis of the given differential equations along with boundary conditions for a stable solution to the problem. The stability of the differential equations is very much essential for the physical stability of the system. Discussed the results of various non-dimensional parameters and found an excellent match with the comparison tables.
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U2 - 10.1063/5.0084385
DO - 10.1063/5.0084385
M3 - Conference contribution
AN - SCOPUS:85127643266
T3 - AIP Conference Proceedings
BT - Proceedings of the 3rd International Conference on Frontiers in Industrial and Applied Mathematics 2020, FIAM 2020
A2 - Nandkeolyar, Raj
A2 - Sharma, Rajesh Kumar
PB - American Institute of Physics Inc.
T2 - 3rd International Conference on Frontiers in Industrial and Applied Mathematics 2020, FIAM 2020
Y2 - 21 December 2020 through 22 December 2020
ER -