Year 2023,
Volume: 5 Issue: 3, 207 - 218, 30.11.2023
Ansar Abbas
,
Abdul Khaliq
Project Number
For this particular research, no specific funding has been allocated.
References
- Abarbanel, H. D. I., 1996 Analysis of Observed Chaotic Data. Number
34, Springer New York, NY.
- Alaydi, S., 1996 An introduction to difference equations. Number 32,
Springer New York, NY.
- Chen, Y. and S. Changming, 2008 Stability and hopf bifurcation
analysis in a prey–predator system with stage-structure for prey
and time delay. Chaos, Solitons & Fractals 38: 1104–1114.
- Fazly, M. and M. Hesaaraki, 2007 Periodic solutions for a discrete
time predator–prey system with monotone functional responses.
Comptes Rendus. Mathématique 345: 199–202.
- Gakkhar, S. and A. Singh, 2012 Complex dynamics in a prey predator
system with multiple delays. Communications in Nonlinear
Science and Numerical Simulation 17: 914–929.
- Garic Demirovic M., K. M. . N. M., 2009 Global behavior of four
competitive rational systems of difference equations in the plane.
Discrete Dynamics in Nature and Society 2009: 153058–153092.
- Hu Z., T. Z. . Z., 2011 Stability and bifurcation analysis of a discrete
predator-prey model with nonmonotonic functional response.
Nonlinear Analysis: Real World Applications 12(4): 2356–2377.
- Ibrahim, T. F. and N. Touafek, 2014 Max-type system of difference
equations with positive two-periodic sequences. Math. methods
Appl. sci 37: 2562–2569.
- Joydip Dhar, H. S. . H. S. B., 2015 Discrete-time dynamics of a
system with crowding effect and predator partially dependent
on prey. Applied Mathematics and Computation 252: 1104–1114.
- Kalabusic S., K. M. . P. E., 2011 Multiple attractors for a competitive
system of rational difference equations in the plane. Abstract
and Applied Analysis 37(16): 1–17.
- Khan, A., 2016 Neimark-Sacker bifurcation of a two-dimensional
discrete-time predator-prey model. SpringerPlus 5: 121–126.
- L. Men, G.W. Z.W. L. .W. L., B. S. Chen, 2015 Hopf bifurcation and
nonlinear state feedback control for a modified Lotka-Volterra
differential algebraic predator-prey system. Fifth International
Conference on Intelligent Control and Information Processing
2015: 233–238.
- Pan, S. X., 2013 Asymptotic spreading in a Lotka-Volterra predatorprey
system. The Journal of Mathematical Analysis and Applications
407: 230–236.
- Q., Q. M. . K. A., 2015 Periodic solutions for discrete time predatorprey
system with monotone functional responses. International
Academy of Ecology and Environmental Sciences 5(1): 48–62.
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and evolutions of predator-prey theory. Journal of Theoretical
Biology 451: 19–34.
- Rana, S., U. Kulsum, et al., 2017 Bifurcation analysis and chaos
control in a discrete-time predator-prey system of leslie type
with simplified holling type iv functional response. Discrete
Dynamics in Nature and Society 2017.
- Salman SM, Y. A. . E. A., 2016 Stability, bifurcation analysis and
chaos control of a discrete predator-prey system with square
root functional response. Chaos Solitons Fractals 93: 20–31.
- Sen M, B. M. . M. A., 2012 Bifurcation analysis of a ratio-dependent
prey-predator model with the Allee effect. Ecological Complexity
11: 12–27.
- Singh, A. and P. Deolia, 2020 Dynamical analysis and chaos control
in discrete-time prey-predator model. Communications in
Nonlinear Science and Numerical Simulation 90: 105313.
- Smith, J. M., 1968 Mathematical Ideas in Biology, volume 1. Cambridge
University Press.
- X. W. Jiang, T. W. H. . H. C. Y., X. Y. Chen, 2021 Bifurcation and
control for a predator-prey system with two delays. IEEE Trans-actions on Circuits and Systems II: Express Briefs 68: 376–380.
- X. Zhang, Z. W. . T. Z., 2016 Periodic solutions for discrete time
predator-prey system with monotone functional responses. Journal
of Biological Dynamics 10: 1–17.
- Z. L. Luo, Y. P. L. . Y. X. D., 2016 Rank one chaos in periodically
kicked Lotka-Volterra predator-prey system with time delay.
Nonlinear Dynamics 85: 797–811.
- Zhang C.H, Y. X. . C. G., 2010 Hopf bifurcations in a predator-prey
system with a discrete delay and a distributed delay. Nonlinear
Anal Real World Application 10: 4141–4153.
- Zu, L., D. Jiang, D. O’Regan, T. Hayat, and B. Ahmad, 2018 Ergodic
property of a lotka–volterra predator–prey model with
white noise higher order perturbation under regime switching.
Applied Mathematics and Computation 330: 93–102.
Analyzing Predator-Prey Interaction in Chaotic and Bifurcating Environments
Year 2023,
Volume: 5 Issue: 3, 207 - 218, 30.11.2023
Ansar Abbas
,
Abdul Khaliq
Abstract
An analysis of discrete-time predator-prey systems is presented in this paper by determining the minimum amount of prey consumed before predators reproduce, as well as by analyzing the system's stability and bifurcation. In order to investigate the local stability of the interior equilibrium point of the proposed model, discrete dynamics system theory is employed first. Moreover, the characteristic equation is analyzed to determine the Neimark-Sacker bifurcation of the system. The normal form and bifurcation theory are used to investigate the NS bifurcation around the interior equilibrium point. Based on its analysis, the system exhibits Neimark-Sacker bifurcation when positive parameters are present and non-negative conditions are met. Develop a feedback control strategy to discover the region of stability of the chaotic behavior. By utilizing the maximum laypanuou exponent, the effect of initial conditions on developed systems is further explored. Finally, a computer simulation illustrates the results of the analysis.
Ethical Statement
It has been reported that none of the authors have any conflicts of interest.
Project Number
For this particular research, no specific funding has been allocated.
References
- Abarbanel, H. D. I., 1996 Analysis of Observed Chaotic Data. Number
34, Springer New York, NY.
- Alaydi, S., 1996 An introduction to difference equations. Number 32,
Springer New York, NY.
- Chen, Y. and S. Changming, 2008 Stability and hopf bifurcation
analysis in a prey–predator system with stage-structure for prey
and time delay. Chaos, Solitons & Fractals 38: 1104–1114.
- Fazly, M. and M. Hesaaraki, 2007 Periodic solutions for a discrete
time predator–prey system with monotone functional responses.
Comptes Rendus. Mathématique 345: 199–202.
- Gakkhar, S. and A. Singh, 2012 Complex dynamics in a prey predator
system with multiple delays. Communications in Nonlinear
Science and Numerical Simulation 17: 914–929.
- Garic Demirovic M., K. M. . N. M., 2009 Global behavior of four
competitive rational systems of difference equations in the plane.
Discrete Dynamics in Nature and Society 2009: 153058–153092.
- Hu Z., T. Z. . Z., 2011 Stability and bifurcation analysis of a discrete
predator-prey model with nonmonotonic functional response.
Nonlinear Analysis: Real World Applications 12(4): 2356–2377.
- Ibrahim, T. F. and N. Touafek, 2014 Max-type system of difference
equations with positive two-periodic sequences. Math. methods
Appl. sci 37: 2562–2569.
- Joydip Dhar, H. S. . H. S. B., 2015 Discrete-time dynamics of a
system with crowding effect and predator partially dependent
on prey. Applied Mathematics and Computation 252: 1104–1114.
- Kalabusic S., K. M. . P. E., 2011 Multiple attractors for a competitive
system of rational difference equations in the plane. Abstract
and Applied Analysis 37(16): 1–17.
- Khan, A., 2016 Neimark-Sacker bifurcation of a two-dimensional
discrete-time predator-prey model. SpringerPlus 5: 121–126.
- L. Men, G.W. Z.W. L. .W. L., B. S. Chen, 2015 Hopf bifurcation and
nonlinear state feedback control for a modified Lotka-Volterra
differential algebraic predator-prey system. Fifth International
Conference on Intelligent Control and Information Processing
2015: 233–238.
- Pan, S. X., 2013 Asymptotic spreading in a Lotka-Volterra predatorprey
system. The Journal of Mathematical Analysis and Applications
407: 230–236.
- Q., Q. M. . K. A., 2015 Periodic solutions for discrete time predatorprey
system with monotone functional responses. International
Academy of Ecology and Environmental Sciences 5(1): 48–62.
- R. M. Eide, N. T. F. . R. A. V. G., A. L. Krause, 2018 The origins
and evolutions of predator-prey theory. Journal of Theoretical
Biology 451: 19–34.
- Rana, S., U. Kulsum, et al., 2017 Bifurcation analysis and chaos
control in a discrete-time predator-prey system of leslie type
with simplified holling type iv functional response. Discrete
Dynamics in Nature and Society 2017.
- Salman SM, Y. A. . E. A., 2016 Stability, bifurcation analysis and
chaos control of a discrete predator-prey system with square
root functional response. Chaos Solitons Fractals 93: 20–31.
- Sen M, B. M. . M. A., 2012 Bifurcation analysis of a ratio-dependent
prey-predator model with the Allee effect. Ecological Complexity
11: 12–27.
- Singh, A. and P. Deolia, 2020 Dynamical analysis and chaos control
in discrete-time prey-predator model. Communications in
Nonlinear Science and Numerical Simulation 90: 105313.
- Smith, J. M., 1968 Mathematical Ideas in Biology, volume 1. Cambridge
University Press.
- X. W. Jiang, T. W. H. . H. C. Y., X. Y. Chen, 2021 Bifurcation and
control for a predator-prey system with two delays. IEEE Trans-actions on Circuits and Systems II: Express Briefs 68: 376–380.
- X. Zhang, Z. W. . T. Z., 2016 Periodic solutions for discrete time
predator-prey system with monotone functional responses. Journal
of Biological Dynamics 10: 1–17.
- Z. L. Luo, Y. P. L. . Y. X. D., 2016 Rank one chaos in periodically
kicked Lotka-Volterra predator-prey system with time delay.
Nonlinear Dynamics 85: 797–811.
- Zhang C.H, Y. X. . C. G., 2010 Hopf bifurcations in a predator-prey
system with a discrete delay and a distributed delay. Nonlinear
Anal Real World Application 10: 4141–4153.
- Zu, L., D. Jiang, D. O’Regan, T. Hayat, and B. Ahmad, 2018 Ergodic
property of a lotka–volterra predator–prey model with
white noise higher order perturbation under regime switching.
Applied Mathematics and Computation 330: 93–102.