A mathematical model for MHD blood flow through a stenosed artery with Soret and Dufour effects in the presence of thermal radiation has been studied. A uniform magnetic field is applied perpendicular to the porous surface. The governing non-linear partial differential equations have been transformed into linear partial differential equations, which are solved numerically by applying the explicit finite difference method. ; The numerical results are presented graphically in the form of velocity, temperature and concentration profiles. The effects of various parameters such as the Reynolds number, Hartmann number, radiation parameter, Schmidt number and Prandtl number, Soret and Dufour parameter on the velocity, temperature and concentration have been examined with the help of graphs. The present results have an important bearing on the therapeutic procedure of hyperthermia, particularly in understanding/regulating blood flow and heat transfer in capillaries.
Zielona Góra: Uniwersytet Zielonogórski
IJAME, volume 24, number 2 (2019)
Biblioteka Uniwersytetu Zielonogórskiego
Jul 6, 2023
Mar 2, 2023
94
https://zbc.uz.zgora.pl/publication/78293
Edition name | Date |
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Radiation effect on MHD blood flow through a tapered porous stenosed artery with thermal and mass diffusion | Jul 6, 2023 |
Sharma, Bhupendra Kumar Sharma, Madhu Gaur, Rajarshi Mishra, Abhishek Jurczak, Paweł - red.
Tripathi, Bhavya Sharma, Bhupendra Kumar Jurczak, Paweł - red.
Sharma, Bhupendra Kumar Tailor, Vikas Goyal, Mahesh Chandra Jurczak, Paweł - red.
Sharma, Bhupendra K. Sharma, Pawan Kumar Chauhan, Sudhir Kumar Jurczak, Paweł - red.
Mirza, Ashik Hussain Dey, Bamdeb Choudhury, Rita Jurczak, Paweł - red.
Sharma, Bhupendra Kumar Singh, Ajit Pratap Yadav, Kailash Chaudhary, R.C. Jurczak, Paweł - red.
Chandrakala, P. Jurczak, Paweł - red.
Phakirappa, J. Priyanka, S. Veena, P.H. Pravin, V.K. Jurczak, Paweł - red.