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Main Authors: Niu, Lei, Song, Yuheng
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2403.05853
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author Niu, Lei
Song, Yuheng
author_facet Niu, Lei
Song, Yuheng
contents In this paper we study the permanence and impermanence for continuous-time competitive Kolmogorov systems via the carrying simplex. We first give an extension to attractors of V. Hutson's results on the existence of repellors in continuous-time dynamical systems that have found wide use in the study of permanence via average Liapunov functions. We then give a general criterion for the stability of the boundary of carrying simplex for competitive Kolmogorov systems of differential equations, which determines the permanence and impermanence of such systems. Based on the criterion, we present a complete classification of the permanence and impermanence in terms of inequalities on parameters for all three-dimensional competitive systems which have linearly determined nullclines. The results are applied to many classical models in population dynamics including the Lotka-Volterrra system, Gompertz system, Leslie-Gower system and Ricker system.
format Preprint
id arxiv_https___arxiv_org_abs_2403_05853
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Permanence for continuous-time competitive Kolmogorov systems via the carrying simplex
Niu, Lei
Song, Yuheng
Dynamical Systems
In this paper we study the permanence and impermanence for continuous-time competitive Kolmogorov systems via the carrying simplex. We first give an extension to attractors of V. Hutson's results on the existence of repellors in continuous-time dynamical systems that have found wide use in the study of permanence via average Liapunov functions. We then give a general criterion for the stability of the boundary of carrying simplex for competitive Kolmogorov systems of differential equations, which determines the permanence and impermanence of such systems. Based on the criterion, we present a complete classification of the permanence and impermanence in terms of inequalities on parameters for all three-dimensional competitive systems which have linearly determined nullclines. The results are applied to many classical models in population dynamics including the Lotka-Volterrra system, Gompertz system, Leslie-Gower system and Ricker system.
title Permanence for continuous-time competitive Kolmogorov systems via the carrying simplex
topic Dynamical Systems
url https://arxiv.org/abs/2403.05853