MODEL PREDATOR-PREY DENGAN DUA PREDATOR

This paper discussed about the predator-prey model with two predators. This model is a development of the model given by Korobeinikov and Wake (1999). Dynamic behavior of the model can be determined based on the stability of the equilibrium point. The stability of the equilibrium point of predator-prey model with two predators on the general ecosystem shows that there is no coexistence state (grown in tandem) on both predators and for a long time one of the predators will lead to the local extinction even though there is no competition between the two predators. Furthermore, this model is applied to the brown plant hopper predator, mirid prey and tomcat prey. The result shows that the population of brown planthopper and both of the predators will oscillate towards a particular value with a shorter span of time. In the long term, the number of brown planthopper and mirid will be heading to the equilibrium point, while the tomcat will lead to local extinction.

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Analysis of The Rosenzweig-MacArthur Predator-Prey Model with Anti-Predator Behavior

CAUCHY ◽

10.18860/ca.v6i4.11472 ◽

2021 ◽

Vol 6 (4) ◽

pp. 260-269

Author(s):

Ismail Djakaria ◽

Muhammad Bachtiar Gaib ◽

Resmawan Resmawan

Keyword(s):

Hopf Bifurcation ◽

Equilibrium Point ◽

Equilibrium Points ◽

Predator Prey ◽

Predator Prey Model ◽

Prey Model ◽

Existence And Stability ◽

The Stability ◽

Population Equilibrium ◽

Predator Behavior

This paper discusses the analysis of the Rosenzweig-MacArthur predator-prey model with anti-predator behavior. The analysis is started by determining the equilibrium points, existence, and conditions of the stability. Identifying the type of Hopf bifurcation by using the divergence criterion. It has shown that the model has three equilibrium points, i.e., the extinction of population equilibrium point (E0), the non-predatory equilibrium point (E1), and the co-existence equilibrium point (E2). The existence and stability of each equilibrium point can be shown by satisfying several conditions of parameters. The divergence criterion indicates the existence of the supercritical Hopf-bifurcation around the equilibrium point E2. Finally, our model's dynamics population is confirmed by our numerical simulations by using the 4th-order Runge-Kutta methods.

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Dynamics of an Eco-Epidemic Predator–Prey Model Involving Fractional Derivatives with Power-Law and Mittag–Leffler Kernel

Symmetry ◽

10.3390/sym13050785 ◽

2021 ◽

Vol 13 (5) ◽

pp. 785

Author(s):

Hasan S. Panigoro ◽

Agus Suryanto ◽

Wuryansari Muharini Kusumawinahyu ◽

Isnani Darti

Keyword(s):

Hopf Bifurcation ◽

Fractional Derivative ◽

Equilibrium Point ◽

Power Law ◽

Equilibrium Points ◽

Essential Difference ◽

Predator Prey ◽

Predator Prey Model ◽

Prey Model ◽

Infected Prey

In this paper, we consider a fractional-order eco-epidemic model based on the Rosenzweig–MacArthur predator–prey model. The model is derived by assuming that the prey may be infected by a disease. In order to take the memory effect into account, we apply two fractional differential operators, namely the Caputo fractional derivative (operator with power-law kernel) and the Atangana–Baleanu fractional derivative in the Caputo (ABC) sense (operator with Mittag–Leffler kernel). We take the same order of the fractional derivative in all equations for both senses to maintain the symmetry aspect. The existence and uniqueness of solutions of both eco-epidemic models (i.e., in the Caputo sense and in ABC sense) are established. Both models have the same equilibrium points, namely the trivial (origin) equilibrium point, the extinction of infected prey and predator point, the infected prey free point, the predator-free point and the co-existence point. For a model in the Caputo sense, we also show the non-negativity and boundedness of solution, perform the local and global stability analysis and establish the conditions for the existence of Hopf bifurcation. It is found that the trivial equilibrium point is a saddle point while other equilibrium points are conditionally asymptotically stable. The numerical simulations show that the solutions of the model in the Caputo sense strongly agree with analytical results. Furthermore, it is indicated numerically that the model in the ABC sense has quite similar dynamics as the model in the Caputo sense. The essential difference between the two models is the convergence rate to reach the stable equilibrium point. When a Hopf bifurcation occurs, the bifurcation points and the diameter of the limit cycles of both models are different. Moreover, we also observe a bistability phenomenon which disappears via Hopf bifurcation.

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Hopf bifurcation in a diffusive predator–prey model with Smith growth rate and herd behavior

Advances in Difference Equations ◽

10.1186/s13662-020-02879-4 ◽

2020 ◽

Vol 2020 (1) ◽

Author(s):

Heping Jiang ◽

Huiping Fang ◽

Yongfeng Wu

Keyword(s):

Hopf Bifurcation ◽

Neumann Boundary ◽

Herd Behavior ◽

Predator Prey ◽

Predator Prey Model ◽

Dynamical Behaviors ◽

Prey System ◽

Prey Model ◽

Homogeneous Neumann Boundary Condition ◽

The Stability

Abstract This paper mainly aims to consider the dynamical behaviors of a diffusive delayed predator–prey system with Smith growth and herd behavior subject to the homogeneous Neumann boundary condition. For the analysis of the predator–prey model, we have studied the existence of Hopf bifurcation by analyzing the distribution of the roots of associated characteristic equation. Then we have proved the stability of the periodic solution by calculating the normal form on the center of manifold which is associated to the Hopf bifurcation points. Some numerical simulations are also carried out in order to validate our analysis findings. The implications of our analytical and numerical findings are discussed critically.

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The long time behavior of a predator–prey model with disease in the prey by stochastic perturbation

Applied Mathematics and Computation ◽

10.1016/j.amc.2014.07.088 ◽

2014 ◽

Vol 245 ◽

pp. 305-320 ◽

Cited By ~ 4

Author(s):

Qiumei Zhang ◽

Daqing Jiang ◽

Zhenwen Liu ◽

Donal O’Regan

Keyword(s):

Stochastic Perturbation ◽

Time Behavior ◽

Long Time Behavior ◽

Predator Prey ◽

Predator Prey Model ◽

Prey Model ◽

Long Time

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Pattern Formation Controlled by External Forcing in a Spatial Harvesting Predator-Prey Model

Interdisciplinary Research and Applications in Bioinformatics, Computational Biology, and Environmental Sciences - Advances in Bioinformatics and Biomedical Engineering ◽

10.4018/978-1-60960-064-8.ch019 ◽

2011 ◽

pp. 214-221

Author(s):

Feng Rao

Keyword(s):

Reaction Diffusion ◽

Euler Method ◽

External Forcing ◽

Periodic Forcing ◽

Predator Prey ◽

Predator Prey Model ◽

Prey Model ◽

Flux Boundary Conditions ◽

Predator Prey Models ◽

The Stability

Predator–prey models in ecology serve a variety of purposes, which range from illustrating a scientific concept to representing a complex natural phenomenon. Due to the complexity and variability of the environment, the dynamic behavior obtained from existing predator–prey models often deviates from reality. Many factors remain to be considered, such as external forcing, harvesting and so on. In this chapter, we study a spatial version of the Ivlev-type predator-prey model that includes reaction-diffusion, external periodic forcing, and constant harvesting rate on prey. Using this model, we study how external periodic forcing affects the stability of predator-prey coexistence equilibrium. The results of spatial pattern analysis of the Ivlev-type predator-prey model with zero-flux boundary conditions, based on the Euler method and via numerical simulations in MATLAB, show that the model generates rich dynamics. Our results reveal that modeling by reaction-diffusion equations with external periodic forcing and nonzero constant prey harvesting could be used to make general predictions regarding predator-prey equilibrium,which may be used to guide management practice, and to provide a basis for the development of statistical tools and testable hypotheses.

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Pattern Formation in Predator-Prey Model with Delay and Cross Diffusion

Abstract and Applied Analysis ◽

10.1155/2013/147232 ◽

2013 ◽

Vol 2013 ◽

pp. 1-10 ◽

Cited By ~ 3

Author(s):

Xinze Lian ◽

Shuling Yan ◽

Hailing Wang

Keyword(s):

Time Delay ◽

Pattern Formation ◽

Turing Instability ◽

Predator Prey ◽

Cross Diffusion ◽

Predator Prey Model ◽

Prey Model ◽

Diffusion Controlled ◽

The Stability ◽

Self Replication

We consider the effect of time delay and cross diffusion on the dynamics of a modified Leslie-Gower predator-prey model incorporating a prey refuge. Based on the stability analysis, we demonstrate that delayed feedback may generate Hopf and Turing instability under some conditions, resulting in spatial patterns. One of the most interesting findings is that the model exhibits complex pattern replication: the model dynamics exhibits a delay and diffusion controlled formation growth not only to spots, stripes, and holes, but also to spiral pattern self-replication. The results indicate that time delay and cross diffusion play important roles in pattern formation.

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Hopf Bifurcation of a Delayed Predator–Prey Model with Nonconstant Death Rate and Constant-Rate Prey Harvesting

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127418501791 ◽

2018 ◽

Vol 28 (14) ◽

pp. 1850179 ◽

Cited By ~ 2

Author(s):

Fengrong Zhang ◽

Xinhong Zhang ◽

Yan Li ◽

Changpin Li

Keyword(s):

Hopf Bifurcation ◽

Time Delay ◽

Differential Equations ◽

Positive Constant ◽

Death Rate ◽

Predator Prey ◽

Predator Prey Model ◽

Prey Model ◽

Constant Rate ◽

The Stability

This paper is concerned with a delayed predator–prey model with nonconstant death rate and constant-rate prey harvesting. We mainly study the impact of the time delay on the stability of positive constant solution of delayed differential equations and positive constant equilibrium of delayed diffusive differential equations, respectively. By choosing time delay [Formula: see text] as a bifurcation parameter, we show that Hopf bifurcation can occur as the time delay passes some critical values. In addition, the direction of Hopf bifurcation and the stability of bifurcating periodic solutions are determined by using the normal form theory and center manifold theorem. Finally, some numerical simulations are carried out to depict our theoretical results.

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Local Bifurcations and Optimal Theory in a Delayed Predator–Prey Model with Threshold Prey Harvesting

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127415400155 ◽

2015 ◽

Vol 25 (07) ◽

pp. 1540015 ◽

Cited By ~ 2

Author(s):

Israel Tankam ◽

Plaire Tchinda Mouofo ◽

Abdoulaye Mendy ◽

Mountaga Lam ◽

Jean Jules Tewa ◽

...

Keyword(s):

Time Delay ◽

Piecewise Linear ◽

Optimal Harvesting ◽

Threshold Policy ◽

Predator Prey ◽

Predator Prey Model ◽

Local Bifurcations ◽

Prey Model ◽

Linear Threshold ◽

The Stability

We investigate the effects of time delay and piecewise-linear threshold policy harvesting for a delayed predator–prey model. It is the first time that Holling response function of type III and the present threshold policy harvesting are associated with time delay. The trajectories of our delayed system are bounded; the stability of each equilibrium is analyzed with and without delay; there are local bifurcations as saddle-node bifurcation and Hopf bifurcation; optimal harvesting is also investigated. Numerical simulations are provided in order to illustrate each result.

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