Back to Search Start Over

Machine learning approach of Casson hybrid nanofluid flow over a heated stretching surface.

Authors :
Ramasekhar, Gunisetty
Alkarni, Shalan
Shah, Nehad Ali
Source :
AIMS Mathematics; 2024, Vol. 9 Issue 7, p18746-18762, 17p
Publication Year :
2024

Abstract

The present investigation focused on the influence of magnetohydrodynamic Gold-Fe<subscript>3</subscript>O<subscript>4</subscript> hybrid nanofluid flow over a stretching surface in the presence of a porous medium and linear thermal radiation. This article demonstrates a novel method for implementing an intelligent computational solution by using a multilayer perception (MLP) feed-forward back-propagation artificial neural network (ANN) controlled by the Levenberg-Marquard algorithm. We trained, tested, and validated the ANN model using the obtained data. In this model, we used blood as the base fluid along with Gold-Fe<subscript>3</subscript>O<subscript>4</subscript> nanoparticles. By using the suitable self-similarity variables, the partial differential equations (PDEs) are transformed into ordinary differential equations (ODEs). After that, the dimensionless equations were solved by using the MATLAB solver in the Fehlberg method, such as those involving velocity, energy, skin friction coefficient, heat transfer rates and other variables. The goals of the ANN model included data selection, network construction, network training, and performance assessment using the mean square error indicator. The influence of key factors on fluid transport properties is presented via tables and graphs. The velocity profile decreased for higher values of the magnetic field parameter and we noticed an increasing tendency in the temperature profile. This type of theoretical investigation is a necessary aspect of the biomedical field and many engineering sectors. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
24736988
Volume :
9
Issue :
7
Database :
Complementary Index
Journal :
AIMS Mathematics
Publication Type :
Academic Journal
Accession number :
178167448
Full Text :
https://doi.org/10.3934/math.2024912