https://orcid.org/0000-0002-6331-2218
References
- P.A. Abrams, When does greater mortality increase population size? The long history and diverse mechanisms underlying the hydra effect, Ecol. Lett. 12(5) (2009), pp. 462–474.
- G. Ambika and N.V. Sujatha, Bubbling and bistability in two parameter discrete systems, Pramana J. Phys. 54 (2000), pp. 751–761.
- B. Aulbach and B. Kieninger, On three definitions of chaos, Nonlinear Dyn. Syst. Theory 1(1) (2001), pp. 23–37.
- V. Baladi and M. Viana, Strong stochastic stability and rate of mixing for unimodal maps, Ann. Sci. Ec. Norm. Super. 29 (1996), pp. 483–517.
- S. Behnia, M. Yahyavi, and R. Habibpourbisafar, Watermarking based on discrete wavelet transform and q-deformed chaotic map, Chaos Solitons and Fractals 104 (2017), pp. 6–17.
- V.Y. Belozyorov and S.A. Volkova, Role of logistic and Ricker's maps in appearance of chaos in autonomous quadratic dynamical systems, Nonlinear Dyn. 83, (2015), pp. 719–729.
- M. Bier and T.C. Bountis, Remerging Feigenbaum trees in dynamical systems, Phys. Lett. A 104(5) (1984), pp. 239–244.
- L. Block, J. Keesling, S. Li, and K. Peterson, An improved algorithm for computing topological entropy, J. Stat. Phys. 55(5–6) (1989), pp. 929–939.
- J. Cánovas and M. Muñoz-Guillermo, On the dynamics of the q-deformed Gaussian map, Int. J. Bifurcat. Chaos 30(8) (2019), pp. 2030021.
- J. Cánovas and M. Muñoz-Guillermo, On the dynamics of the q-deformed logistic map, Phys. Lett. A 383(15) (2019), pp. 1742–1754.
- R.M. Corless, G.H. Gonnet, D.E.G. Hare, D.J. Jeffrey, and D.E. Knuth, On the Lambert W function, Adv. Comput. Math. 5 (1996), pp. 329–359.
- W. de Melo and S.van. Strien, One-dimensional Dynamics, Vol. 25, Springer Berlin, Heidelberg, 2012.
- S.N. Elaydi, Discrete Chaos: With Application in Science and Engineering, 2nd ed., Chapman and Hall/CRC, New York, 2007.
- S.N. Elaydi and R.J. Sacker, Population models with Allee effects: a new model, J. Biol. Dyn. 4(4) (2010), pp. 397–408.
- D. Gupta and V.V.M. S. Chandramouli, An improved q-deformed logistic map and its implications, Pranama J. Phys. 95(175) (2021), pp. 1–8.
- S.V. Iyengar and J. Balakrishnan, q-deformations and the dynamics of the larch bud-moth population cycles, in Nature's longest threads: New Frontiers in the Mathematics and Physics of Information in Biology, World Scientific, Singapore, 2014. pp. 65–80.
- R. Jaganathan and S. Sinha, A q-deformed nonlinear map, Phys. Lett. A 338(3-5) (2005), pp. 277–287.
- S.H. Li, ω-chaos and topological entropy, Trans. Am. Math. Soc. 339(1) (1993), pp. 243–249.
- G. Livadiotis, L. Assas, S. Elaydi, E. kwessi, and D. Ribble, Competition models with Allee effects, J. Differ. Equ. Appl. 20(8) (2014), pp. 1127–1151.
- E. Liz, Complex dynamics of survival and extinction in simple population models with harvesting, Theor. Ecol. 3 (2010), pp. 209–221.
- E. Liz and A. Ruiz-Herrera, The hydra effect, bubbles, and chaos in a simple discrete population model with constant effort harvesting, J. Math. Biol. 65(5) (2012), pp. 997–1016.
- E. Liz and F.M. Hilker, Harvesting and dynamics in some one-dimensional population models, Theory Appl. Differ. Equ. Discrete Dyn. Syst. 102 (2014), pp. 61–73.
- V. Patidar and K.K. Sud, A comparative study on the co-existing attractors in the Gaussian map and its q-deformed version, Commun. Nonlinear Sci. Numer. Simul. 14 (2009), pp. 827–838.
- W.E. Ricker, Stock and recruitment, J. Fish. Res. Board Can. 11(5) (1954), pp. 559–623.
- J.L. Rocha, A.K. Taha, and D. Fournier-Prunaret, Dynamics and bifurcations of a map of homographic Ricker type, Nonlinear Dyn. 102 (2020), pp. 1129–1149.
- R.J. Sacker, A note on periodic Ricker map, J. Differ. Equ. Appl. 13(1) (2007), pp. 89–92.
- R.J Sacker and G.R. Sell, Almost periodicity, Ricker map, Beverton-Holt map and others, a general method, J. Differ. Equ. Appl. 23 (2017), pp. 1286–1297.
- S.J. Schreiber, Allee effects, extinctions, and chaotic transients in simple population models, Theoretical population biology 64(2) (2003), pp. 201–209.
- J. Smital, Chaotic functions with zero topological entropy, Trans. Am. Math. Soc. 297(1) (1986), pp. 269–282.
- H. Thunberg, Periodicity versus chaos in one-dimensional dynamics, SIAM Rev. 43(1) (2000), pp. 3–30.
- C. Tsallis, Possible generalization of Boltzmann–Gibbs statistics, J. Stat. Phys. 52(1) (1988), pp. 479–487.
- S. Willard, General Topology, Dover publications, New York, 2004.
- E. Zipkin, C. Kraft, E. Cooch, and P. Sullivan, When can efforts to control nuisance and invasive species backfire?, Ecol. Appl. 19 (2009), pp. 1585–1595.