Your search keyword '"Dong, Qinglai"' showing total 3 results

1. Asymptotic behavior of a Lotka–Volterra food chain stochastic model in the Chemostat.

Author

Sun, Mingjuan, Dong, Qinglai, and Wu, Jing

Subjects

*STOCHASTIC models, *CHEMOSTAT, *LOTKA-Volterra equations, *LYAPUNOV functions, *COMPUTER simulation

Abstract

This article studies the asymptotic behavior of a stochastic Chemostat model with Lotka–Volterra food chain in which the dilution rate was influenced by white noise. The long-time behavior of the model is studied. Using Lyapunov function and Itô's formula, we show that there is a unique positive solution to the system. Moreover, the sufficient conditions for some population dynamical properties including the boundedness in mean and the stochastically asymptotic stability of the washout equilibrium were obtained. Furthermore, we show how the solutions spiral around the predator-free equilibrium and the positive equilibrium of deterministic system. Besides, the existence of the stationary distribution is proved for the considered model. Numerical simulations are introduced finally to support the obtained results. [ABSTRACT FROM AUTHOR]

Published

2017

2. Qualitative analysis of a chemostat model with inhibitory exponential substrate uptake and a time delay.

Author

Dong, Qinglai and Ma, Wanbiao

Subjects

*CHEMOSTAT, *TIME delay systems, *STABILITY theory, *LYAPUNOV functions, *PRINCIPLE of relativity (Physics)

Abstract

In this paper, we consider a simple chemostat model with inhibitory exponential substrate uptake and a time delay. A detailed qualitative analysis about existence and boundedness of its solutions and the local asymptotic stability of its equilibria are carried out. Using Lyapunov-LaSalle invariance principle, we show that the washout equilibrium is global asymptotic stability for any time delay. Using the fluctuation lemma, the sufficient condition of the global asymptotic stability of the positive equilibrium is obtained. Numerical simulations are also performed to illustrate the results. [ABSTRACT FROM AUTHOR]

Published

2014

3. The asymptotic behavior of a Chemostat model with Crowley-Martin type functional response and time delays.

Author

Dong, Qinglai, Ma, Wanbiao, and Sun, Mingjuan

Subjects

*CHEMOSTAT, *MATHEMATICAL models, *FUNCTIONAL analysis, *TIME delay systems, *LYAPUNOV functions, *STABILITY theory, *MATHEMATICAL symmetry

Abstract

In this paper, we introduce an improved Chemostat model with Crowley-Martin type functional response and time delays. By constructing Lyapunov functionals, the global asymptotic stability of the equilibria is shown in the case of a single species. The conditions for the global asymptotical stability of the model with time delays are obtained via monotone dynamical systems in the case of two species. Our results demonstrate that the effects of predator interference may result in coexistence of two species. [ABSTRACT FROM AUTHOR]

Published

2013