Initial-Boundary-Value Problem Of Hyperbolic Equations For Viscous Blood Flow Through A Tapered Vessel
Abstract
In this paper, the effect of viscosity on blood flow through a tapered artery is studied. Approximate solutions of the coupled nonlinear partial differential equations that model the viscous blood a complaint artery are obtained using Adomian decomposition method (ADM). The convergence and parametric study of the solution are presented and discussed including shock development. The result of the computation shows that viscosity has significant influence on blood flow.
Downloads
Published
2021-04-08
How to Cite
Adesanya, S. O. (2021). Initial-Boundary-Value Problem Of Hyperbolic Equations For Viscous Blood Flow Through A Tapered Vessel. Journal of the Nigerian Mathematical Society, 33(1-3), 273–283. Retrieved from https://ojs.ictp.it/jnms/index.php/jnms/article/view/724
Issue
Section
Articles
License
This work is licensed under a Creative Commons Attribution-ShareAlike 4.0 International License.