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Permanence, extinction and global attractivity of the periodic Gilpin-Ayala competition system with impulses. (English) Zbl 1255.34056

Summary: A periodic \(n\)-species Gilpin-Ayala competition system with impulses is studied. By constructing a suitable Lyapunov function and using the comparison theorem of impulsive differential equations, a set of sufficient conditions which guarantee that some species in the system are permanent and globally attractive while the remaining species are driven to extinction are obtained. Our results show that the dynamic behaviors of the system we considered are quite different from the corresponding system without impulses.

MSC:

34D20 Stability of solutions to ordinary differential equations
93C15 Control/observation systems governed by ordinary differential equations
34D05 Asymptotic properties of solutions to ordinary differential equations
92D25 Population dynamics (general)
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