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A Mathematical Modelling of a Plant-Herbivore Community with Additional Effects of Food on the Environment

Ashraf Adnan Thirthar

2023Iraqi Journal of Science15 citationsDOIOpen Access PDF

Abstract

By taking into account various food components in the ecosystem, the research intends to develop a set of difference equations to simulate a plant-herbivore interaction of Holling Type II. We determine the local stability of the equilibrium points for the scenarios of extinction, semi-extinction (extinction for one species), and coexistence using the Linearized Stability Theorem. For a suitable Lyapunov function, we investigate theoretical findings to determine the global stability of the coexisting equilibrium point. It is clear that the system exhibits both Flip and Neimark-Sacker bifurcation under particular circumstances using the central manifold theorem and the bifurcation theory. Numerical simulations are done by MATLAB which are used to validate our conclusions.

Topics & Concepts

Extinction (optical mineralogy)Stability (learning theory)Lyapunov functionMathematicsApplied mathematicsBifurcationBifurcation theoryEquilibrium pointSet (abstract data type)MATLABCenter manifoldFunctional responseHerbivoreStability theoryControl theory (sociology)Computer scienceEcologyMathematical analysisHopf bifurcationPhysicsArtificial intelligenceBiologyPredationOperating systemNonlinear systemPredatorProgramming languageControl (management)Machine learningOpticsQuantum mechanicsDifferential equationMathematical and Theoretical Epidemiology and Ecology ModelsAnimal Ecology and Behavior StudiesEvolution and Genetic Dynamics
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