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Uniform persistence and almost periodic solutions of a nonautonomous patch occupancy model

Hui Zhou, Jehad Alzabut, Shahram Rezapour, Mohammad Esmael Samei

2020Advances in Difference Equations25 citationsDOIOpen Access PDF

Abstract

Abstract In this paper, a nonlinear nonautonomous model in a rocky intertidal community is studied. The model is composed of two species in a rocky intertidal community and describes a patch occupancy with global dispersal of propagules and occupy each other by individual organisms. Firstly, we study the uniform persistence of the model via differential inequality techniques. Furthermore, a sharp threshold of global asymptotic stability and the existence of a unique almost periodic solution are derived. To prove the main results, we construct an appropriate Lyapunov function whose conditions are easily verified. The assumptions of the model are reasonable, and the results complement previously known ones. An example with specific values of parameters is included for demonstration of theoretical outcomes.

Topics & Concepts

Ordinary differential equationOccupancyMathematicsPersistence (discontinuity)PropaguleLyapunov functionBiological dispersalApplied mathematicsPartial differential equationIntertidal zoneNonlinear systemStability (learning theory)Differential equationMathematical analysisEcologyComputer sciencePhysicsGeologyMachine learningQuantum mechanicsPopulationBiologyDemographyGeotechnical engineeringSociologyMathematical and Theoretical Epidemiology and Ecology ModelsStochastic processes and statistical mechanicsEvolution and Genetic Dynamics
Uniform persistence and almost periodic solutions of a nonautonomous patch occupancy model | Litcius