Dynamical analysis of a chemostat model for 4-chlorophenol and sodium salicylate mixture biodegradation

Q2 Agricultural and Biological Sciences
Neli Dimitrova
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引用次数: 0

Abstract

We consider a mathematical continuous-time model for biodegradation of 4-chlorophenol and sodium salicylate mixture by the microbial strain Pseudomonas putida in a chemostat. The model is described by a system of three nonlinear ordinary differential equations and is proposed for the first time in the paper [Y.-H. Lin, B.-H. Ho, Biodegradation kinetics of phenol and 4-chlorophenol in the presence of sodium salicylate in batch and chemostat systems, Processes, 10:694, 2022], where the model is only quantitatively verified. This paper provides a detailed analysis of the system dynamics. Some important basic properties of the model solutions like existence, uniqueness and uniform boundedness of positive solutions are established. Computation of equilibrium points and study of their local asymptotic stability and bifurcations in dependence of the dilution rate as a key model parameter are also presented. Thereby, particular intervals for the dilution rate are found, where one or three interior (with positive components) equilibrium points do exist and possess different types of local asymptotic stability/instability. Hopf bifurcations are detected leading to the occurrence of stable limit cycles around some interior equilibrium points. A transcritical bifurcation also exists and implies stability exchange between an interior and the boundary (washout) equilibrium. The results are illustrated by lots of numerical examples.
对 4-氯苯酚和水杨酸钠混合物生物降解恒温模型的动力学分析
我们考虑了微生物菌株恶臭假单胞菌在趋化器中生物降解4-氯苯酚和水杨酸钠混合物的数学连续时间模型。该模型由三个非线性常微分方程系统描述,首次在论文[y - h]中提出。林,B.-H。何,水杨酸钠存在下苯酚和4-氯苯酚的生物降解动力学[j],化学学报,10(6):694,2022。本文对系统动力学进行了详细的分析。建立了模型解的存在性、唯一性和正解的一致有界性等重要的基本性质。给出了平衡点的计算方法,并研究了平衡点的局部渐近稳定性和以稀释率为关键模型参数的分岔。因此,找到了稀释率的特定区间,其中确实存在一个或三个内部(具有正分量)平衡点,并且具有不同类型的局部渐近稳定性/不稳定性。检测到Hopf分岔导致在一些内部平衡点周围出现稳定极限环。跨临界分岔也存在,它意味着内部平衡和边界平衡(冲刷)之间的稳定交换。通过大量的数值算例对结果进行了说明。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Biomath
Biomath Agricultural and Biological Sciences-Agricultural and Biological Sciences (miscellaneous)
CiteScore
2.20
自引率
0.00%
发文量
6
审稿时长
20 weeks
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