Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits
The dispersion of solute play an important role in many chemical engineering, biomedical engineering and environmental sciences applications. The main interest of this study is the dispersion of solute (medicine) in blood (solvent) flow. An appropriate mathematical model is required to investigate t...
Saved in:
Main Author: | |
---|---|
Format: | Thesis |
Language: | English |
Published: |
2017
|
Subjects: | |
Online Access: | http://eprints.usm.my/45470/1/NURUL%20AINI%20JAAFAR.pdf |
Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
id |
my-usm-ep.45470 |
---|---|
record_format |
uketd_dc |
spelling |
my-usm-ep.454702019-09-18T07:07:07Z Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits 2017-02 Jaafar,, Nurul Aini QA1-939 Mathematics The dispersion of solute play an important role in many chemical engineering, biomedical engineering and environmental sciences applications. The main interest of this study is the dispersion of solute (medicine) in blood (solvent) flow. An appropriate mathematical model is required to investigate the dispersion of solute in blood flow. In this study, the dispersion of solute in a blood flow is analyzed mathematically by treating the blood as a Herschel-Bulkley (H-B) fluid model through narrow conduits, namely, a circular pipe and a channel between two parallel flat plates. The steady dispersion of solute in blood flow without/with the presence of a chemical reaction between the solute and blood are considered. 2017-02 Thesis http://eprints.usm.my/45470/ http://eprints.usm.my/45470/1/NURUL%20AINI%20JAAFAR.pdf application/pdf en public phd doctoral Universiti Sains Malaysia Pusat Pengajian Sains Matematik |
institution |
Universiti Sains Malaysia |
collection |
USM Institutional Repository |
language |
English |
topic |
QA1-939 Mathematics |
spellingShingle |
QA1-939 Mathematics Jaafar,, Nurul Aini Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits |
description |
The dispersion of solute play an important role in many chemical engineering, biomedical engineering and environmental sciences applications. The main interest of this study is the dispersion of solute (medicine) in blood (solvent) flow. An appropriate mathematical model is required to investigate the dispersion of solute in blood flow. In this study, the dispersion of solute in a blood flow is analyzed mathematically by treating the blood as a Herschel-Bulkley (H-B) fluid model through narrow conduits, namely, a circular pipe and a channel between two parallel flat plates. The steady dispersion of solute in blood flow without/with the presence of a chemical reaction between the solute and blood are considered. |
format |
Thesis |
qualification_name |
Doctor of Philosophy (PhD.) |
qualification_level |
Doctorate |
author |
Jaafar,, Nurul Aini |
author_facet |
Jaafar,, Nurul Aini |
author_sort |
Jaafar,, Nurul Aini |
title |
Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits |
title_short |
Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits |
title_full |
Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits |
title_fullStr |
Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits |
title_full_unstemmed |
Mathematical Analysis Of Herschel-Bulkley Fluid Model For Solute Dispersion In Blood Flow Through Narrow Conduits |
title_sort |
mathematical analysis of herschel-bulkley fluid model for solute dispersion in blood flow through narrow conduits |
granting_institution |
Universiti Sains Malaysia |
granting_department |
Pusat Pengajian Sains Matematik |
publishDate |
2017 |
url |
http://eprints.usm.my/45470/1/NURUL%20AINI%20JAAFAR.pdf |
_version_ |
1747821516934873088 |