Your search keyword '"Itô’s formula"' showing total 3 results

1. Asymptotic behavior of a stochastic HIV model with Beddington–DeAngelis functional response.

Author

Wang, Suxia, Zhao, Juan, Zhu, Junxing, and Ren, Xiaoli

Subjects

*STOCHASTIC models, *COMPUTER simulation, *BEHAVIOR, *LYAPUNOV functions

Abstract

In this paper, we study the dynamics property of a stochastic HIV model with Beddington–DeAngelis functional response. It has a unique uninfected steady state. We prove that the model has a unique global positive solution. Furthermore, if the basic reproductive number is not larger than 1, the asymptotic behavior of the solution is stochastically stable. Otherwise, it fluctuates randomly around the infected steady state of the corresponding deterministic HIV model. Finally, some numerical simulations are carried out to verify our results. [ABSTRACT FROM AUTHOR]

Published

2020

2. The threshold of stochastic SIS epidemic model with saturated incidence rate.

Author

Han, Qixing, Jiang, Daqing, Lin, Shan, and Yuan, Chengjun

Subjects

*STOCHASTIC models, *EPIDEMIOLOGICAL models, *DISEASE incidence, *UNIQUENESS (Mathematics), *INVARIANTS (Mathematics), *COMPUTER simulation

Abstract

This paper considers a stochastic SIS model with saturated incidence rate. We investigate the existence and uniqueness of the positive solution to the system, and we show the condition for the infectious individuals to be extinct. Moreover, we prove that the system has the ergodic property and derive the expression for its invariant density. The simulation results are illustrated finally. [ABSTRACT FROM AUTHOR]

Published

2015

3. Dynamics of COVID-19 mathematical model with stochastic perturbation.

Author

Zhang, Zizhen, Zeb, Anwar, Hussain, Sultan, and Alzahrani, Ebraheem

Subjects

*STOCHASTIC models, *CONTINUOUS time models, *MATHEMATICAL models, *COVID-19, *COMPUTER simulation

Abstract

Acknowledging many effects on humans, which are ignored in deterministic models for COVID-19, in this paper, we consider stochastic mathematical model for COVID-19. Firstly, the formulation of a stochastic susceptible–infected–recovered model is presented. Secondly, we devote with full strength our concentrated attention to sufficient conditions for extinction and persistence. Thirdly, we examine the threshold of the proposed stochastic COVID-19 model, when noise is small or large. Finally, we show the numerical simulations graphically using MATLAB. [ABSTRACT FROM AUTHOR]

Published

2020