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Global dynamics of a Lotka–Volterra competition patch model*

Shanshan Chen, Junping Shi, Zhisheng Shuai, Yixiang Wu

2021Nonlinearity43 citationsDOIOpen Access PDF

Abstract

Abstract The global dynamics of the two-species Lotka–Volterra competition patch model with asymmetric dispersal is classified under the assumptions that the competition is weak and the weighted digraph of the connection matrix is strongly connected and cycle-balanced. We show that in the long time, either the competition exclusion holds that one species becomes extinct, or the two species reach a coexistence equilibrium, and the outcome of the competition is determined by the strength of the inter-specific competition and the dispersal rates. Our main techniques in the proofs follow the theory of monotone dynamical systems and a graph-theoretic approach based on the tree-cycle identity.

Topics & Concepts

MathematicsMonotone polygonCompetition (biology)Biological dispersalGraphDigraphCompetition modelOutcome (game theory)Mathematical economicsCombinatoricsEcologyBiologyDemographyMicroeconomicsProfit (economics)PopulationEconomicsSociologyGeometryMathematical and Theoretical Epidemiology and Ecology ModelsEcosystem dynamics and resilienceEcology and Vegetation Dynamics Studies
Global dynamics of a Lotka–Volterra competition patch model* | Litcius