Periodic solution and global stability for a nonautonomous competitive Lotka-Volterra diffusion system

Article ID	Journal	Published Year	Pages	File Type
4631761	Applied Mathematics and Computation	2010	8 Pages	PDF

Abstract

The periodic solution and global stability for a nonautonomous competitive Lotka-Volterra diffusion system is considered in this paper. By using of Brouwer fixed point theorem and constructing a suitable Liapunov function, under some appropriate conditions, the system has a unique periodic solution which is globally stable.

Keywords

Global stability Positive periodic solution Competitive system

Related Topics

Physical Sciences and Engineering Mathematics Applied Mathematics

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Periodic solution and global stability for a nonautonomous competitive Lotka-Volterra diffusion system

Authors

Wei Fengying, Lin Yangrui, Que Lulu, Chen Yingying, Wu Yunping, Xue Yuanfu,