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Paper detail

Global dynamics of a Lotka-Volterra competition patch model

The global dynamics of the two-species Lotka-Volterra competition patch model with asymmetric dispersal is classified under the assumptions of weak competition and the weighted digraph of the connection matrix is strongly connected and cycle-balanced. It is shown 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 system and a graph-theoretic approach based on the Tree-Cycle identity.

preprint2021arXivOpen access
Shanshan ChenJunping ShiZhisheng ShuaiYixiang Wu
math.CA
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Shanshan ChenJunping ShiZhisheng ShuaiYixiang Wu

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