Content area
Abstract
In this paper, we investigate a ratio-dependent prey–predator model with state-dependent impulsive harvesting where the prey growth rate is subject to a strong Allee effect. The existence of order-1 homoclinic cycle is obtained, and choosing \[\alpha \] as a control parameter, the existence, uniqueness and stability of order-1 periodic solution of the system are discussed by means of the geometry theory of semi-continuous dynamic system. We also investigate that system exhibits the phenomenon of homoclinic bifurcation about parameter \[\alpha \]. Moreover, the numerical simulations are provided to show the main results. The used methods are intuitive to prove the existence of order-1 periodic solution and homoclinic bifurcation.
Details
Title
Homoclinic bifurcation of a ratio-dependent predator–prey system with impulsive harvesting
Author
Chunjin Wei 1 ; Liu, Junnan 1 ; Chen, Lansun 2
1 Science College, Jimei University, Xiamen, Fujian, People’s Republic of China
2 Academy of Mathematics and System Sciences, Chinese Academy of Sciences, Beijing, People’s Republic of China
1 Science College, Jimei University, Xiamen, Fujian, People’s Republic of China
2 Academy of Mathematics and System Sciences, Chinese Academy of Sciences, Beijing, People’s Republic of China
Pages
2001-2012
Publication year
2017
Publication date
Aug 2017
ISSN
0924090X
e-ISSN
1573269X
Source type
Scholarly Journal
Language of publication
English
ProQuest document ID
2259463762
Copyright
Nonlinear Dynamics is a copyright of Springer, (2017). All Rights Reserved.