Numerical Solutions For Two Dimensional Time-Fractional Differential Sub-Diffusion Equation
In the past several decades, fractional differential equations (differential equation involving arbitrary order derivatives) have acquired much popularity in the area of science and engineering. This is because such equations can better model certain problems of fluid mechanics, physics, biologic...
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Format: | Thesis |
Language: | English |
Published: |
2019
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Online Access: | http://eprints.usm.my/61154/1/Numerial%20solutions%20for%20two%20dimensional%20cut.pdf |
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author | Ali, Umair |
author_facet | Ali, Umair |
author_sort | Ali, Umair |
collection | USM |
description | In the past several decades, fractional differential equations (differential equation
involving arbitrary order derivatives) have acquired much popularity in the area
of science and engineering. This is because such equations can better model certain
problems of fluid mechanics, physics, biological science, chemistry, hydrology and
finance, amongst others, due to the fact that it can better represent system with memory.
However, most fractional differential equations cannot be solved by exact analytical
techniques. |
first_indexed | 2024-09-25T03:58:05Z |
format | Thesis |
id | usm.eprints-61154 |
institution | Universiti Sains Malaysia |
language | English |
last_indexed | 2024-09-25T03:58:05Z |
publishDate | 2019 |
record_format | dspace |
spelling | usm.eprints-611542024-09-18T07:56:02Z http://eprints.usm.my/61154/ Numerical Solutions For Two Dimensional Time-Fractional Differential Sub-Diffusion Equation Ali, Umair QA303-316 Calculus In the past several decades, fractional differential equations (differential equation involving arbitrary order derivatives) have acquired much popularity in the area of science and engineering. This is because such equations can better model certain problems of fluid mechanics, physics, biological science, chemistry, hydrology and finance, amongst others, due to the fact that it can better represent system with memory. However, most fractional differential equations cannot be solved by exact analytical techniques. 2019-04 Thesis NonPeerReviewed application/pdf en http://eprints.usm.my/61154/1/Numerial%20solutions%20for%20two%20dimensional%20cut.pdf Ali, Umair (2019) Numerical Solutions For Two Dimensional Time-Fractional Differential Sub-Diffusion Equation. PhD thesis, Universiti Sains Malaysia. |
spellingShingle | QA303-316 Calculus Ali, Umair Numerical Solutions For Two Dimensional Time-Fractional Differential Sub-Diffusion Equation |
title | Numerical Solutions For Two
Dimensional Time-Fractional
Differential Sub-Diffusion Equation |
title_full | Numerical Solutions For Two
Dimensional Time-Fractional
Differential Sub-Diffusion Equation |
title_fullStr | Numerical Solutions For Two
Dimensional Time-Fractional
Differential Sub-Diffusion Equation |
title_full_unstemmed | Numerical Solutions For Two
Dimensional Time-Fractional
Differential Sub-Diffusion Equation |
title_short | Numerical Solutions For Two
Dimensional Time-Fractional
Differential Sub-Diffusion Equation |
title_sort | numerical solutions for two dimensional time fractional differential sub diffusion equation |
topic | QA303-316 Calculus |
url | http://eprints.usm.my/61154/1/Numerial%20solutions%20for%20two%20dimensional%20cut.pdf |
work_keys_str_mv | AT aliumair numericalsolutionsfortwodimensionaltimefractionaldifferentialsubdiffusionequation |