Advanced search
Publication Cover
International Journal of General Systems Volume 50, 2021 - Issue 7
Submit an article Journal homepage
311
Views
3
CrossRef citations to date
0
Altmetric
Research Article

Role of fear factor in a two-prey one-predator model: comparison between crisp and fuzzy environment

Soumya Dasa Department of Mathematics, Indian Institute of Engineering Science and Technology, Shibpur, Howrah, IndiaView further author information
,
Suvankar Biswasb Mathematics Discipline, School of Sciences, Indira Gandhi National Open University, New Delhi, IndiaCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-3305-0130View further author information
ORCID Icon,
Ritwick Banerjeea Department of Mathematics, Indian Institute of Engineering Science and Technology, Shibpur, Howrah, IndiaView further author information
&
Pritha Dasa Department of Mathematics, Indian Institute of Engineering Science and Technology, Shibpur, Howrah, IndiaView further author information
Pages 815-847 | Received 26 May 2021, Accepted 08 Sep 2021, Published online: 28 Oct 2021

References

  • Agiza, H., E. Elabbasy, H. El-Metwally, and A. Elsadany. 2009. “Chaotic Dynamics of a Discrete Prey–predator Model with Holling Type Ii.” Nonlinear Analysis: Real World Applications 10 (1): 116–129.
  • Ahmad, M. Z., and M. K. Hasan. 2012. “Modeling of Biological Populations Using Fuzzy Differential Equations.” In International Journal of Modern Physics: Conference Series, Vol. 9, 354–363. World Scientific.
  • Akın, O., and O. Oruç. 2012. “A Prey Predator Model with Fuzzy Initial Values.” Hacettepe Journal of Mathematics and Statistics 41 (3): 387–395.
  • Allahviranloo, T., S. Abbasbandy, S. Salahshour, and A. Hakimzadeh. 2011. “A New Method for Solving Fuzzy Linear Differential Equations.” Computing 92 (2): 181–197.
  • Banerjee, R., P. Das, and D. Mukherjee. 2020. “Global Dynamics of a Holling Type-iii Two Prey–one Predator Discrete Model with Optimal Harvest Strategy.” Nonlinear Dynamics 99 (4): 1–16.
  • Barros, L., R. Bassanezi, and P. Tonelli. 2000. “Fuzzy Modelling in Population Dynamics.” Ecological Modelling 128 (1): 27–33.
  • Bassanezi, R. C., L. C. de Barros, and P. A. Tonelli. 2000. “Attractors and Asymptotic Stability for Fuzzy Dynamical Systems.” Fuzzy Sets and Systems 113 (3): 473–483.
  • Bede, B., I. J. Rudas, and A. L. Bencsik. 2007. “First Order Linear Fuzzy Differential Equations Under Generalized Differentiability.” Information Sciences 177 (7): 1648–1662.
  • Biswas, S., and T. K. Roy. 2018. “Generalization of Seikkala Derivative and Differential Transform Method for Fuzzy Volterra Integro-differential Equations.” Journal of Intelligent & Fuzzy Systems 34 (4): 2795–2806.
  • Biswas, S., and T. K. Roy. 2019. “A Semianalytical Method for Fuzzy Integro-differential Equations Under Generalized Seikkala Derivative.” Soft Computing 23 (17): 7959–7975.
  • Boubellouta, A., F. Zouari, and A. Boulkroune. 2019. “Intelligent Fuzzy Controller for Chaos Synchronization of Uncertain Fractional-order Chaotic Systems with Input Nonlinearities.” International Journal of General Systems 48 (3): 211–234.
  • Buckley, J. J., and T. Feuring. 2000. “Fuzzy Differential Equations.” Fuzzy Sets and Systems 110 (1): 43–54.
  • Chang, S. S., and L. A. Zadeh. 1996. “On Fuzzy Mapping and Control.” In Fuzzy Sets, Fuzzy Logic, and Fuzzy Systems: Selected papers by Lotfi A Zadeh, 180–184. World Scientific.
  • Chen, M., C. Wu, X. Xue, and G. Liu. 2008. “On Fuzzy Boundary Value Problems.” Information Sciences 178 (7): 1877–1892.
  • da Silva Peixoto, M., L. C. de Barros, and R. C. Bassanezi. 2008. “Predator–prey Fuzzy Model.” Ecological Modelling 214 (1): 39–44.
  • Das, S., P. Mahato, and S. K. Mahato. 2020. “Disease Control Prey–predator Model Incorporating Prey Refuge Under Fuzzy Uncertainty.” Modeling Earth Systems and Environment 6 (3): 1–18.
  • Diamond, P. 2002. “Brief Note on the Variation of Constants Formula for Fuzzy Differential Equations.” Fuzzy Sets and Systems 129 (1): 65–71.
  • Diamond, P., and P. E. Kloeden. 1994. Metric Spaces of Fuzzy Sets: Theory and Applications. Singapore: World scientific.
  • Dubois, D., and H. Prade. 1982. “Towards Fuzzy Differential Calculus Part 3: Differentiation.” Fuzzy Sets and Systems 8 (3): 225–233.
  • Feng, L., Z. Wu, and S. Zheng. 2018. “A Note on Explosion Suppression for Nonlinear Delay Differential Systems by Polynomial Noise.” International Journal of General Systems 47 (2): 137–154.
  • Ghosh, P., P. Das, and D. Mukherjee. 2016. “Chaos to Order–effect of Random Predation in a Holling Type Iv Tri-trophic Food Chain System with Closure Terms.” International Journal of Biomathematics 9 (05): 1650073.
  • Goetschel Jr, R., and W. Voxman. 1986. “Elementary Fuzzy Calculus.” Fuzzy Sets and Systems 18 (1): 31–43.
  • Holling, C. S. 1959. “The Components of Predation As Revealed by a Study of Small-mammal Predation of the European Pine Sawfly.” The Canadian Entomologist 91 (5): 293–320.
  • Hua, F., K. E. Sieving, R. J. Fletcher Jr, and C. A. Wright. 2014. “Increased Perception of Predation Risk to Adults and Offspring Alters Avian Reproductive Strategy and Performance.” Behavioral Ecology 25 (3): 509–519.
  • James Dickson, M. 2003. Mathematical Biology II: Spatial Models and Biomedical Applications. Vol. 18, 1–839. Springer.
  • Kaleva, O. 1987. “Fuzzy Differential Equations.” Fuzzy Sets and Systems 24 (3): 301–317.
  • Kar, T., and B. Ghosh. 2012. “Sustainability and Optimal Control of An Exploited Prey Predator System Through Provision of Alternative Food to Predator.” Bio Systems 109 (2): 220–232.
  • Khandani, K. 2019. “A Sliding Mode Observer Design for Uncertain Fractional Ito Stochastic Systems with State Delay.” International Journal of General Systems 48 (1): 48–65.
  • Li, H., and Y. Takeuchi. 2011. “Dynamics of the Density Dependent Predator–prey System with Beddington–deangelis Functional Response.” Journal of Mathematical Analysis and Applications 374 (2): 644–654.
  • Li, J., and W. Gao. 2010. “Analysis of a Prey–predator Model with Disease in Prey.” Applied Mathematics and Computation 217 (8): 4024–4035.
  • Lotka, A. J. 1956. Elements of Physical Biology (1925). Baltimore: Williams and Wilkins.
  • Malthus, T. R. 1798. An Essay on the Principle of Population, as it Affects the Future Improvement of Society. With Remarks on the Speculations of Mr. Godwin, M. Condorcet, and other writers. By TR Malthus. London: Electronic Scholarly Publishing Project.
  • Mizumoto, M., and K. Tanaka. 1976. “The Four Operations of Arithmetic on Fuzzy Numbers.” System Computer Controls 7 (5): 73–81.
  • Morozov, A., S. Petrovskii, and B.-L. Li. 2004. “Bifurcations and Chaos in a Predator–prey System with the Allee Effect.” Proceedings of the Royal Society of London. Series B: Biological Sciences 271 (1546): 1407–1414.
  • Mukherjee, D. 2020. “Role of Fear in Predator–prey System with Intraspecific Competition.” Mathematics and Computers in Simulation 177: 263–275.
  • Nieto, J. J., and R. Rodriguez-Lopez. 2008. “Analysis of a Logistic Differential Model with Uncertainty.” International Journal of Dynamical Systems and Differential Equations 1 (3): 164–176.
  • O'Regan, D., V. Lakshmikantham, and J. J. Nieto. 2003. “Initial and Boundary Value Problems for Fuzzy Differential Equations.” Nonlinear Analysis: Theory, Methods & Applications 54 (3): 405–415.
  • Pal, D., G. Mahapatra, and G. Samanta. 2016. “Stability and Bionomic Analysis of Fuzzy Prey–predator Harvesting Model in Presence of Toxicity: A Dynamic Approach.” Bulletin of Mathematical Biology 78 (7): 1493–1519.
  • Pal, S., S. Majhi, S. Mandal, and N. Pal. 2019. “Role of Fear in a Predator–prey Model with Beddington-Deangelis Functional Response.” Zeitschrift für Naturforschung A 74 (7): 581–595.
  • Panday, P., N. Pal, S. Samanta, and J. Chattopadhyay. 2019. “A Three Species Food Chain Model with Fear Induced Trophic Cascade.” International Journal of Applied and Computational Mathematics 5 (4): 100.
  • Panja, P. 2018. “Fuzzy Parameter Based Mathematical Model on Forest Biomass.” Biophysical Reviews and Letters 13 (04): 179–193.
  • Panja, P., S. K. Mondal, and J. Chattopadhyay. 2017. “Dynamical Study in Fuzzy Threshold Dynamics of a Cholera Epidemic Model.” Fuzzy Information and Engineering 9 (3): 381–401.
  • Paul, S., P. Bhattacharya, and K. Chaudhuri. 2016. “Stability Analysis of a Two Species Competition Model With Fuzzy Initial Condition: Fuzzy Differential Equation Approach Environment. In Biomat 2015: International Symposium on Mathematical and Computational Biology, 334–344. World Scientific.
  • Peacor, S. D., B. L. Peckarsky, G. C. Trussell, and J. R. Vonesh. 2013. “Costs of Predator-induced Phenotypic Plasticity: a Graphical Model for Predicting the Contribution of Nonconsumptive and Consumptive Effects of Predators on Prey.” Oecologia 171 (1): 1–10.
  • Puri, M. L., and D. A. Ralescu. 1983. “Differentials of Fuzzy Functions.” Journal of Mathematical Analysis and Applications 91 (2): 552–558.
  • Ramazannia, T. S., and A. M. Barkhordari. 2010. “Fuzzy Laplace Transform on Two Order Derivative and Solving Fuzzy Two Order Differential Equations.” International Journal of Industrial Mathematics 2: 279–293.
  • Roy, S. K., and B. Roy. 2016. “Analysis of Prey–predator Three Species Fishery Model with Harvesting Including Prey Refuge and Migration.” International Journal of Bifurcation and Chaos 26 (02): 1650022.
  • Sen, M., M. Banerjee, and A. Morozov. 2012. “Bifurcation Analysis of a Ratio-dependent Prey–predator Model with the Allee Effect.” Ecological Complexity 11: 12–27.
  • Sengupta, S., and P. Das. 2019. “Dynamics of Two-prey One-predator Non-autonomous Type-iii Stochastic Model with Effect of Climate Change and Harvesting.” Nonlinear Dynamics 97 (4): 2777–2798.
  • Soukkou, A., A. Boukabou, and A. Goutas. 2018. “Generalized Fractional-order Time-delayed Feedback Control and Synchronization Designs for a Class of Fractional-order Chaotic Systems.” International Journal of General Systems 47 (7): 679–713.
  • Tapaswini, S., and S. Chakraverty. 2013. “Numerical Solution of Fuzzy Arbitrary Order Predator–prey Equations.” Applications & Applied Mathematics 8 (2): 1–26.
  • Verhulst, P.-F. 1838. “Notice Sur La Loi Que La Population Suit Dans Son Accroissement.” Corresp. Math. Phys. 10: 113–126.
  • Volterra, V. 1927. Variazioni e fluttuazioni del numero d'individui in specie animali conviventi. Italy: C. Ferrari.
  • Wang, X., L. Zanette, and X. Zou. 2016. “Modelling the Fear Effect in Predator–prey Interactions.” Journal of Mathematical Biology 73 (5): 1179–1204.
  • Xiao, Y., and L. Chen. 2001. “Modeling and Analysis of a Predator–prey Model with Disease in the Prey.” Mathematical Biosciences 171 (1): 59–82.
  • Yao, J.-S., and K. Wu. 2000. “Ranking Fuzzy Numbers Based on Decomposition Principle and Signed Distance.” Fuzzy Sets and Systems 116 (2): 275–288.
  • Yin, C., Y. Chen, and S.-m. Zhong. 2014. “Fractional-order Sliding Mode Based Extremum Seeking Control of a Class of Nonlinear Systems.” Automatica 50 (12): 3173–3181.
  • Yin, C., Y. Cheng, Y. Chen, B. Stark, and S. Zhong. 2015. “Adaptive Fractional-order Switching-type Control Method Design for 3d Fractional-order Nonlinear Systems.” Nonlinear Dynamics 82 (1-2): 39–52.
  • Zadeh, L. A. 1965. “Fuzzy Sets.” Information and Control 8 (3): 338–353.
  • Zanette, L. Y., A. F. White, M. C. Allen, and M. Clinchy. 2011. “Perceived Predation Risk Reduces the Number of Offspring Songbirds Produce Per Year.” Science (New York, N.Y.) 334 (6061): 1398–1401.
  • Zimmerman, H. 1996. Fuzzy Set Theory and it Applications. Massachusetts: Kluwer.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.