摘要
建立一类受环境扰动的随机SIRS传染病模型来分析其动力学行为。首先证明了该模型对任意的正初始值具有唯一的全局正解,其次根据所构造的李雅普诺夫函数,应用伊藤公式讨论了疾病灭绝的充分条件,以及疾病在均值意义下的持久性,最后数值模拟验证了理论结果。
The dynamic behavior is analyzed by developing a class of stochastic SIRS epidemic model subjected to environmental disturbance.The model is first shown to have a unique global positive solution for any positive initial value.Secondly,the surfficient conditions for disease extinction and its persistence in the mean sense are discussed according to the constructed Lyapunov function and using the Ito formula.Finally,the theoretical results are verified by numerical simulations.
作者
何雪晴
韦煜明
HE Xueqing;WEI Yuming(College of Mathematics and Statistics,Guangxi Normal University,Guilin Guangxi 541000,China)
出处
《阜阳师范大学学报(自然科学版)》
2021年第2期11-16,共6页
Journal of Fuyang Normal University:Natural Science
基金
国家自然科学基金项目(11961074)
广西科技基地和人才专项(2018AD19211)资助。
