Abstract
In this paper we characterize the existence of coexistence states for the classical Lotka-Volterra predator-prey model with periodic coefficients and analyze the dynamics of positive solutions of such models. Among other results we show that if some trivial or semi-trivial positive state is linearly stable, then it is globally asymptotically stable with respect to the positive solutions. In fact, the model possesses a coexistence state if, and only if, any of the semi-trivial states is unstable. Some permanence and uniqueness results are also found. An example exhibiting a unique coexistence state that is unstable is given.
Citation
Julián López-Gómez. Rafael Ortega. Antonio Tineo. "The periodic predator-prey Lotka-Volterra model." Adv. Differential Equations 1 (3) 403 - 423, 1996. https://doi.org/10.57262/ade/1366896045
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