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作 者:Jiemin Mo Wanying Li Donghuan He Songbo Wang Xiaoliang Zhou Jiemin Mo;Wanying Li;Donghuan He;Songbo Wang;Xiaoliang Zhou(School of Mathematics and Statistics, Lingnan Normal University, Zhanjiang, China;School of Business, Lingnan Normal University, Zhanjiang, China)
机构地区:[1]School of Mathematics and Statistics, Lingnan Normal University, Zhanjiang, China [2]School of Business, Lingnan Normal University, Zhanjiang, China
出 处:《Journal of Applied Mathematics and Physics》2023年第10期2871-2878,共8页应用数学与应用物理(英文)
摘 要:A predator-prey model with linear capture term Holling-II functional response was studied by using differential equation theory. The existence and the stabilities of non-negative equilibrium points of the model were discussed. The results show that under certain limited conditions, these two groups can maintain a balanced position, which provides a theoretical reference for relevant departments to make decisions on ecological protection.A predator-prey model with linear capture term Holling-II functional response was studied by using differential equation theory. The existence and the stabilities of non-negative equilibrium points of the model were discussed. The results show that under certain limited conditions, these two groups can maintain a balanced position, which provides a theoretical reference for relevant departments to make decisions on ecological protection.
关 键 词:Predator-Prey Model Holling-II Functional Response Equilibrium Point STABILITY
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