A Two Phase Mathematical Model of Fluid Flow through Bell Shaped Stenotic Artery
Madan Lal1, Yantish Dev Jha2, Haris Alam Zuberi3
1Madan Lal, Department of Applied Mathematics, M. J. P. Rohilkhand University, Bareilly, India.
2Yantish Dev Jha*, Department of Applied Mathematics, M. J. P. Rohilkhand University, Bareilly, India.
3Haris Alam Zuberi, Department of Applied Mathematics, M. J. P. Rohilkhand University, Bareilly, India.
Manuscript received on February 10, 2020. | Revised Manuscript received on February 23, 2020. | Manuscript published on March 10, 2020. | PP: 35-38 | Volume-9 Issue-5, March 2020. | Retrieval Number: E1966039520/2020©BEIESP | DOI: 10.35940/ijitee.E1966.039520
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© The Authors. Blue Eyes Intelligence Engineering and Sciences Publication (BEIESP). This is an open access article under the CC BY-NC-ND license (http://creativecommons.org/licenses/by-nc-nd/4.0/)
Abstract: The present research paper concerns with a two phase fluid flow, consists an acentric plasma layer region free from red cells and a central core region represented by Hershel – Bulkley fluid through a bell shaped stenosed artery. Mathematical expressions for characteristics of blood flow namely core velocity (uc ), peripheral velocity ( up ), shear stress at wall ( ) and total volumetric fluid flow rate (Q) have been estimated and depicted graphically . The effect of shape parameter peripheral layer viscosity, on these characteristics has been depicted with graphs. It has been noticed that the fluid flow rate (Q) and shear stress at wall ( ) decreases as the increases of peripheral layer viscosity.
Keywords: Blood flow, Bell Shaped Stenosis, Flow Rate , Plasma layer, Shear Stress at Wall.
Scope of the Article: Probabilistic Models and Methods