窄圆圆蝽与圆突蝽相互作用数学模型的多重稳定性分析

Pub Date : 2017-01-01 DOI:10.12988/JITE.2017.6938
Juliana Chitai, Adu A. M. Wasike
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引用次数: 0

摘要

我们建立了一个数学模型,显示了杂草Opuntia stricta和昆虫Dactylopius opuntiae相互作用的主要动力机制。证明了在适当条件下,系统的正解是渐近稳定的、不稳定的或周期解。稳定平衡点以地方性种群和流行种群为特征。地方性种群受可用仙人掌树数量的控制。流行的种群数量受到树木总数的限制,因为昆虫的大规模攻击可能会克服任何树木的抵抗力。数学学科分类:93A30、92B05、34C23
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Multistability analysis of a mathematical model of the interaction of Opuntia stricta and Dactylopius opuntiae
We develop a Mathematical model showing the main dynamical regimes of the weed Opuntia stricta and the insect, Dactylopius opuntiae interaction. We prove that under appropriate conditions a positive solution of the system is asymptotically stable, unstable or it is a periodic solution. Stable equilibria points are characterised by endemic and epidemic populations. Endemic populations are regulated by the number of cacti trees available. Epidemic populations are limited by the total number of trees because mass attack of the insects may overcome resistance of any tree. Mathematics Subject Classification: 93A30, 92B05, 34C23
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