Mathematical Model of HYFX Branching type
In this research, we studied a case for fungal growth when mixing four types of them, study these types consume all the energy. Mathematical models are used as partial differential equations that explain the biological phenomena of each species. It will take some time to get an approximate solutio...
Main Authors: | , |
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Format: | Article |
Language: | English |
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College of Education for Pure Sciences
2022-09-01
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Series: | Wasit Journal for Pure Sciences |
Online Access: | https://wjps.uowasit.edu.iq/index.php/wjps/article/view/27 |
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author | Zainab Hussein Khalil Ali Shuaa |
author_facet | Zainab Hussein Khalil Ali Shuaa |
author_sort | Zainab Hussein Khalil |
collection | DOAJ |
description |
In this research, we studied a case for fungal growth when mixing
four types of them, study these types consume all the energy. Mathematical models are used as partial differential equations that explain the biological phenomena of each species. It will take some time to get an approximate solution to this system and this is a fact of fungal growth. The solution of this system depends on the numerical solution and this solution gives an approximate solution. Therefore, in this solution we need some static steps such as nondimensionlision, stablility, travlling wave solution and numerical solution. We used some codes (pplane7, Pdepe) in numerical analysis because of the difficulty in the direct mathematical solution, and therefore from all this we get a set of results and conclusions, which are direct and inverse relationships with the growth rate of fungi
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first_indexed | 2024-03-07T18:48:37Z |
format | Article |
id | doaj.art-af6e2511906d4c3eb57a3abe9d32594a |
institution | Directory Open Access Journal |
issn | 2790-5233 2790-5241 |
language | English |
last_indexed | 2024-03-07T18:48:37Z |
publishDate | 2022-09-01 |
publisher | College of Education for Pure Sciences |
record_format | Article |
series | Wasit Journal for Pure Sciences |
spelling | doaj.art-af6e2511906d4c3eb57a3abe9d32594a2024-03-02T02:03:41ZengCollege of Education for Pure SciencesWasit Journal for Pure Sciences2790-52332790-52412022-09-011210.31185/wjps.27 Mathematical Model of HYFX Branching type Zainab Hussein Khalil0Ali ShuaaCollege of Education for Pure Sciences, Wasit University, Iraq In this research, we studied a case for fungal growth when mixing four types of them, study these types consume all the energy. Mathematical models are used as partial differential equations that explain the biological phenomena of each species. It will take some time to get an approximate solution to this system and this is a fact of fungal growth. The solution of this system depends on the numerical solution and this solution gives an approximate solution. Therefore, in this solution we need some static steps such as nondimensionlision, stablility, travlling wave solution and numerical solution. We used some codes (pplane7, Pdepe) in numerical analysis because of the difficulty in the direct mathematical solution, and therefore from all this we get a set of results and conclusions, which are direct and inverse relationships with the growth rate of fungi https://wjps.uowasit.edu.iq/index.php/wjps/article/view/27 |
spellingShingle | Zainab Hussein Khalil Ali Shuaa Mathematical Model of HYFX Branching type Wasit Journal for Pure Sciences |
title | Mathematical Model of HYFX Branching type |
title_full | Mathematical Model of HYFX Branching type |
title_fullStr | Mathematical Model of HYFX Branching type |
title_full_unstemmed | Mathematical Model of HYFX Branching type |
title_short | Mathematical Model of HYFX Branching type |
title_sort | mathematical model of hyfx branching type |
url | https://wjps.uowasit.edu.iq/index.php/wjps/article/view/27 |
work_keys_str_mv | AT zainabhusseinkhalil mathematicalmodelofhyfxbranchingtype AT alishuaa mathematicalmodelofhyfxbranchingtype |