Geometric method for global stability of discrete population models
A class of autonomous discrete dynamical systems as population models for competing species are considered when each nullcline surface is a hyperplane. Criteria are established for global attraction of an interior or a boundary fixed point by a geometric method utilising the relative position of the...
Main Author: | Hou, Zhanyuan |
---|---|
Format: | Article |
Language: | English |
Published: |
American Institute of Mathematical Sciences (AIMS)
2020
|
Subjects: | |
Online Access: | https://repository.londonmet.ac.uk/5298/1/Geometric%20method%20for%20global%20tability%20of%20discrete%20population%20models.pdf |
Similar Items
-
Global stability of discrete-time competitive population models
by: Baigent, Stephen, et al.
Published: (2017) -
Global stability and repulsion in autonomous Kolmogorov systems
by: Hou, Zhanyuan, et al.
Published: (2015) -
On existence and uniqueness of a modified carrying simplex for discrete Kolmogorov systems
by: Hou, Zhanyuan
Published: (2021) -
Global attraction and repulsion of a heteroclinic limit cycle in three dimensional Kolmogorov maps
by: Hou, Zhanyuan
Published: (2023) -
Geometric method for global stability and repulsion in Kolmogorov systems
by: Hou, Zhanyuan
Published: (2018)