Approximation of invariant measure for a stochastic population model with Markov chain and diffusion in a polluted environment
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Publication:1979543
DOI10.3934/mbe.2020349zbMath1471.92254OpenAlexW3090615687WikidataQ104619339 ScholiaQ104619339MaRDI QIDQ1979543
Ting Kang, Yanyan Du, Ming Ye, Qi-min Zhang
Publication date: 3 September 2021
Published in: Mathematical Biosciences and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3934/mbe.2020349
Markov chainlocal Lipschitz conditionstochastic population modelinvariance measurediscrete-time Euler-Maruyama scheme
Related Items (2)
Stationary distribution and optimal control of a stochastic population model in a polluted environment ⋮ Global attractor and threshold dynamics of a reaction-diffusion population model in a polluted environment
Cites Work
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- Approximation of invariant measures for regime-switching diffusions
- A stochastic single-species population model with partial pollution tolerance in a polluted environment
- Long term behaviors of stochastic single-species growth models in a polluted environment. II
- Persistence and extinction of a population in a polluted environment
- Hybrid switching diffusions. Properties and applications
- Persistence in population models with demographic fluctuations
- The threshold of survival for systems in a fluctuating environment
- Continuous-time Markov chains. An applications-oriented approach
- Numerical solution of a fuzzy stochastic single-species age-structure model in a polluted environment
- Explicit approximations for nonlinear switching diffusion systems in finite and infinite horizons
- Convergence of the split-step \(\theta\)-method for stochastic age-dependent population equations with Poisson jumps
- Persistence and extinction of a stochastic single-specie model under regime switching in a polluted environment. II
- Thresholds of survival for an \(n\)-dimensional Volterra mutualistic system in a polluted environment
- Effects of diffusion on a stage-structured population in a polluted environment
- Dynamical model of a single-species system in a polluted environment
- The stationary distribution of the facultative population model with a degenerate noise
- Persistence and ergodicity of a stochastic single species model with Allee effect under regime switching
- Global martingale solutions for a stochastic population cross-diffusion system
- The effect of Lévy noise on the survival of a stochastic competitive model in an impulsive polluted environment
- Survival analysis of a stochastic single-species population model with jumps in a polluted environment
- Stability for multispecies population models in random environments
- Stationary distributions of Euler–Maruyama-type stochastic difference equations with Markovian switching and their convergence
- Ergodicity for Infinite Dimensional Systems
- Numerical approximation of invariant measures for hybrid diffusion systems
- PERSISTENCE AND GLOBAL STABILITY OF A POPULATION IN A POLLUTED ENVIRONMENT WITH DELAY
- Stochastic Differential Equations with Markovian Switching
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