Paper Info
Title
Dynamical behavior in a harvested differential-algebraic prey–predator model with discrete time delay and stage structure
Abstract
A differential-algebraic model system which considers a prey–predator system with stage structure for prey and harvest effort on predator is proposed. By using the differential-algebraic system theory and bifurcation theory, the dynamic behaviors of the proposed model system with and without discrete time delay are investigated. Local stability analysis of the model system without discrete time delay reveals that there is a phenomenon of singularity induced bifurcation due to variation of the economic interest of harvesting, and a state feedback controller is designed to stabilize the proposed model system at the interior equilibrium; on the other hand, the local stability of the model system with discrete time delay is also studied. The theoretical analysis shows that the discrete time delay has a destabilizing effect in the model of population dynamics, and a phenomenon of Hopf bifurcation occurs as the discrete time delay increases through a certain threshold. Numerical simulations are carried out to show the consistency with theoretical analysis.
Year
DOI
Venue
2009
10.1016/j.jfranklin.2009.06.004
Journal of the Franklin Institute
Keywords
Field
DocType
Differential-algebraic system,Stage structure,Discrete time delay,Harvesting,Bifurcation
Period-doubling bifurcation,Population,Full state feedback,Control theory,Bifurcation theory,Singularity,Discrete time and continuous time,Mathematics,Hopf bifurcation,Bifurcation
Journal
Volume
Issue
ISSN
346
10
0016-0032
Citations 
PageRank 
References 
13
1.30
6
Authors
3
Name
Order
Citations
PageRank
Chao Liu1182.24
Qingling Zhang21353100.93
Duan Xiaodong38516.18