Ali Hussein Shuaa scite author profile

Ali Hussein Shuaa

5Publications

0Citation Statements Received

7Citation Statements Given

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Affiliations

University of Wasit

Publications

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Mathematical Model of the Effect the Energy on (Y-W-D) Types of Fungi , with Exponential function

Khwedim

Shuaa²

2022

wjps

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The phenomenon of dysplasia describes the mathematical model. The model that shows the behaviour of the growth of bilateral branching, lateral branching, filament tip anastomosis, limb anastomosis, and limb death due to overcrowd- ing with thread death. The study shows energy consumption; in general that the growth of fungi needs to be resolved until its goal becomes a correction. More- over the study reduced the cost, effort by predicting the best class of plants for cultivation according to the results. Herein we suggest mathematical solution using the solution of Partial Differential Equations (PDEs). Furthermore, Matlab software codes were utilized numerical analysis because of some of the difficulties we face in the direct mathematical solution. Finally, the study mod- els shows the success or failure of the growth of the studied fungi

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Numerical solutions of generalized Abel integral and integro differential equations

Naseer

Abdullah

Shuaa

2022

Journal of Interdisciplinary Mathematics

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Mathematical Model of Tip-hypha Anastomosis and Dichotomous Branching with Hyphal Death

Ajme

Shuaa

2021

J. Phys.: Conf. Ser.

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In this paper, We studied the case of growth of kinds of fungi when blend two kinds of hyphal anastomosis and Dichotomous branched with a hyphal death. These species consume all energy. We use mathematical models as partial differential equations (PDEs) which illustrate phenomena biological for each kind. we need Some time, that’s true for the growth of fungi. To get an approximate solution for this system, we will rely on the numerical solution. For this, we need Some of the steps in this solution are stationary, phase, and traveling states Solution And to determine the initial condition. we will use the code and Thus we recognize the behavior of the kinds.

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Mathematical Model of the Effect of Hyphal Death on T-W Types of fungi with Energy

Jafaar

Shuaa

2021

J. Phys.: Conf. Ser.

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The mathematical model is model show behavior for growth of Tip-tip anastomosis, Tip death hyphal death and we show the consumption energy. In general, To mathematical modeling to shorten the effort, time and mony to get the right result even though there is error ratio. In this paper we will study a mathematical model of branching using the solution of a system of partial equations (PDEs). The results of this solution will be describe a success or failure of the growth of the fungus species studied, and we used some codes in numerical analysis because some difficulty in direct mathematical solution.[2]

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Mathematical Model Of YFWXHD Branching Type With Hyphal Death

Kadhim¹,

Shuaa²

2023

wjps

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Mathematical modeling is used to describe the fungus growth process. This model depicts the growth-related behavior of Dichotomous branching, Lateral branching , Tip-tip anastomosis , Tip death due to Overcrowding, Tip-hypha anasto-mosis with haphal death , we are aware that fungi require money to flourish. Money and effort. Thus, we get a mathematical solution. Although the error ratio, to reduce the time, expense, and work needed to get the right conclusion. In this paper, we will use a system of partial differential equations to solve a mathematical model (PDEs), and for the numerical analysis, we applied several codes, (pplane8, pdepe).

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