Global qualitative analysis of new Monod type chemostat model with delayed growth response and pulsed input in polluted environment 被引量：1

Global qualitative analysis of new Monod type chemostat model with delayed growth response and pulsed input in polluted environment

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摘要 In this paper, we consider a new Monod type chemostat model with time delay and impulsive input concentration of the nutrient in a polluted environment. Using the discrete dynamical system determined by the stroboscopic map, we obtain a ＂microorganism-extinction＂ periodic solution. Further, we establish the sufficient conditions for the global attractivity of the microorganism-extinction periodic solution. Using new computational techniques for impulsive and delayed differential equation, we prove that the system is permanent under appropriate conditions. Our results show that time delay is ＂profitless＂. In this paper, we consider a new Monod type chemostat model with time delay and impulsive input concentration of the nutrient in a polluted environment. Using the discrete dynamical system determined by the stroboscopic map, we obtain a ＂microorganism-extinction＂ periodic solution. Further, we establish the sufficient conditions for the global attractivity of the microorganism-extinction periodic solution. Using new computational techniques for impulsive and delayed differential equation, we prove that the system is permanent under appropriate conditions. Our results show that time delay is ＂profitless＂.

作者孟新柱赵秋兰陈兰荪

机构地区 College of Science Department of Applied Mathematics

出处《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2008年第1期75-87,共13页 应用数学和力学（英文版）

基金 Project supported by the National Natural Science Foundation of China(Nos.10471117 and 10771179) the Natural Science Foundation of Shandong University of Science and Technology(No.05g016)

关键词 PERMANENCE impulsive input chemostat model time delay for growth response EXTINCTION permanence, impulsive input, chemostat model, time delay for growth response, extinction

分类号 O175 [理学—基础数学]

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参考文献15

1Mingjing Sun,Lansun Chen.Analysis of the dynamical behavior for enzyme-catalyzed reactions with impulsive input[J].Journal of Mathematical Chemistry.2008(2)
2Shulin Sun,Lansun Chen.Dynamic behaviors of Monod type chemostat model with impulsive perturbation on the nutrient concentration[J].Journal of Mathematical Chemistry.2007(4)
3Huaxing Xia,Gail S.K. Wolkowicz,Lin Wang.Transient oscillations induced by delayed growth response in the chemostat[J].Journal of Mathematical Biology.2005(5)
4J. K. Hale,A. S. Somolinos.Competition for fluctuating nutrient[J].Journal of Mathematical Biology.1983(3)
5S. B. Hsu.A competition model for a seasonally fluctuating nutrient[J].Journal of Mathematical Biology.1980(2)
6Simth H L,Waltman P.The theory of the chemostat[]..1995
7Picket A M.Growth in a changing environment[].Microbial Population Dynamics.1982
8Monod J.La technique de culture continue;théorie et applications[].Annales de l Institut Pasteur.1950
9Smith R J,Wolkowicz Gail S K.Analysis of a model of the nutrient driven self-cycling fermentation process[].Dynamics of ContinuousDiscrete and Impulsive SystemsSeries B.2004
10Hsu S B.A competition model for a seasonally fluctuating nutrient[].Journal of Mathematical Biology.1980

同被引文献14

1Zhong Zhao,Lansun Chen,Xinyu Song.Extinction and permanence of chemostat model with pulsed input in a polluted environment[J]. Communications in Nonlinear Science and Numerical Simulation . 2008 (4)
2Zhong Zhao,Lansun Chen.Dynamic analysis of lactic acid fermentation in membrane bioreactor[J]. Journal of Theoretical Biology . 2008 (2)
3Shulin Sun,Lansun Chen.Dynamic behaviors of Monod type chemostat model with impulsive perturbation on the nutrient concentration[J]. Journal of Mathematical Chemistry . 2007 (4)
4Xueyong Zhou,Xinyu Song,Xiangyun Shi.Analysis of competitive chemostat models with the Beddington–DeAngelis functional response and impulsive effect[J]. Applied Mathematical Modelling . 2006 (10)
5Fengyan Wang,Chunping Hao,Lansun Chen.Bifurcation and chaos in a Tessiet type food chain chemostat with pulsed input and washout[J]. Chaos, Solitons and Fractals . 2005 (4)
6Zhongyi Xiang,Xinyu Song.A model of competition between plasmid-bearing and plasmid-free organisms in a chemostat with periodic input[J]. Chaos, Solitons and Fractals . 2005 (4)
7V.Sree Hari Rao,P.Raja Sekhara Rao.Global stability in chemostat models involving time delays and wall growth[J]. Nonlinear Analysis: Real World Applications . 2003 (1)
8S. R.-J. Jang.Dynamics of variable-yield nutrient–phytoplankton–zooplankton models with nutrient recycling and self-shading[J]. Journal of Mathematical Biology . 2000 (3)
9Xue-Zhong He,Shigui Ruan.Global stability in chemostat-type plankton models with delayed nutrient recycling[J]. Journal of Mathematical Biology . 1998 (3)
10Shigui Ruan.The effect of delays on stability and persistence in plankton models[J]. Nonlinear Analysis . 1995 (4)

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1李秀琴,宋国华.一类微生物食物链模型的持续生存[J].生物数学学报,2004,19(3):295-302. 被引量：2
2蒋里强,马知恩,P.Fergola,C.Tenneriello.PERSISTENCE OF POPULATIONS FORA PREDATOR-PREY SYSTEM IN A POLLUTED ENVIRONMENT[J].Annals of Differential Equations,1999,15(2):127-142. 被引量：2
3王铁英,陈长海,陈兰荪.一类带Monod增长率及脉冲状态反馈控制的微生物杀虫剂模型的周期解（英文）[J].生物数学学报,2013,28(4):577-585. 被引量：1
4薄锋,朱健强,康俊,陈刚.双菱体λ/4消色差相位延迟器的设计[J].光子学报,2008,37(1):136-139. 被引量：1
5蒋里强,马知恩.Stability of a Chem ostatModelfor a Single Specieswith Delayed NutrientRecycling——Case ofWeak KernelFunction[J].Chinese Quarterly Journal of Mathematics,1998,13(1):64-69.
6何泽荣,马知恩.THE SURVIVAL ANALYSIS FOR GALLOPIN'S SYSTEM IN A POLLUTED ENVIRONMENT[J].Applied Mathematics and Mechanics(English Edition),2000,21(8):921-928.
7Xiao-jian Li,Ke Wang.The Survival Analysis of a Non-autonomous N-dimensional Volterra Mutualistic System in a Polluted Environment[J].Acta Mathematicae Applicatae Sinica,2007,23(1):133-140. 被引量：1
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9Yong-guang Yu,Suo-chun Zhang,Da-li Yang.The Analysis of Model on Population Growth with Stage-structure in the Polluted Environment[J].Acta Mathematicae Applicatae Sinica,2006,22(2):265-272. 被引量：1
10魏春金,陈兰荪.在污染环境下竞争Monod恒化器模型的动力学分析[J].应用数学学报,2010,33(6):990-1000.

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Global qualitative analysis of new Monod type chemostat model with delayed growth response and pulsed input in polluted environment 被引量：1

参考文献15

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