Litcius/Paper detail

Bifurcation and Control for a Predator-Prey System With Two Delays

Xiaowei Jiang, Xiangyong Chen, Tingwen Huang, Huaicheng Yan

2020IEEE Transactions on Circuits & Systems II Express Briefs42 citationsDOI

Abstract

This brief mainly studies the dynamic analysis and control problem for the Leslie-Gower predator-prey system, which is established by a delay-differential equation. We use the Euler scheme to derive the discrete form of Leslie-Gower model. By discussing the associated characteristic equation, its dynamics properties, including stability analysis and Neimark-Sacker bifurcation, are investigated. Furthermore, we use the center manifold reduction and normal form theory to show the directions of Neimark-Sacker bifurcation, and we also analyze the stability of periodic bifurcation solution. In order to achieve effective control of the above bifurcation, we proposed a novel delayed feedback control scheme. Finally, an simulation example is given to verify the effectiveness of the main conclusion.

Topics & Concepts

Center manifoldBifurcationMathematicsSaddle-node bifurcationApplied mathematicsBifurcation diagramControl theory (sociology)Stability (learning theory)Transcritical bifurcationBiological applications of bifurcation theoryCharacteristic equationDifferential equationControl (management)Mathematical analysisHopf bifurcationComputer sciencePhysicsNonlinear systemArtificial intelligenceMachine learningQuantum mechanicsMathematical and Theoretical Epidemiology and Ecology ModelsChaos control and synchronizationNonlinear Dynamics and Pattern Formation
Bifurcation and Control for a Predator-Prey System With Two Delays | Litcius