https://orcid.org/0000-0003-1489-5872
References
- Available at https://github.com/kdayers/tentmap_invariant, 2021.
- A.Y. Aleksandrov and A.P. Zhabko, On stability of solutions to one class of nonlinear difference systems, Sib. Math. J. 44(6) (2003), pp. 951–958.
- B.R. Andrievsky and A.L. Fradkov, Control of Chaos: Methods and applications, I. Methods, Avtomat. I Telemekh. 64(5) (2003), pp. 3–45.
- O. Biham and W. Wenzel, Characterization of unstable periodic orbits in chaotic aitractors and repellers, Phys. Rev. Lett. 63(8) (1989), pp. 819–822.
- G. Chen and X. Dong, From chaos to Order: Methodologies, Perspectives and Application, World Scientific, Singapore, 1999.
- B. Derrida, A. Gervois, and Y. Pomeau, Iteration of endomorphisms on the real axis and representation of numbers, Ann. Inst. H. Poincare Sect. A (N.S.) 29 (1978), pp. 305–356.
- R.L. Devaney, An Introduction to Chaotic Dynamical Systems, 2nd ed., Addison-Wesley Publ. Co., New York, 1993.
- S.M. de Vieira and A.J. Lichtenberg, Controlling chaos using nonlinear feedback with delay, Phys. Rev. E. 54(2) (1996), pp. 1200–1207.
- L.E Dickson, The History of the Theory of Numbers, Vol. I, Carnegie Institute of Washington, 1919.
- D. Dmitrishin and A. Khamitova, Methods of harmonic analysis in nonlinear dynamics, Comptes. Rendus. Math. 351(9–10) (2013), pp. 367–370.
- D. Dmitrishin, G. Skrinnik, I.and Lesaja, and A. Stokolos, A new method for finding cycles by semilinear control, Phys. Lett. A. 383(16) (2019), pp. 1871–1878.
- D.V. Dmitrishin, A.M. Stokolos, and I.E. Iacob, Average predictive control for nonlinear discrete dynamical systems, Adv. Syst. Sci. Appl. 20(1) (2020), pp. 27–49.
- Z. Elhadj and J.C. Sprott, A two-dimensional discrete mapping with C∞ multifold chaotic attractors, Electron. J. Theor. Phys. 17(5) (2008), pp. 1–14.
- Z. Galias, Interval methods for rigorous investigations of periodic orbits, Int. J. Bifurc. Chaos. 11(9) (2001), pp. 2427–2450.
- Z. Galias, Rigorous investigations of Ikeda map by means of interval arithmetic, Nonlinearity 15(6) (2002), pp. 1759–1779.
- W.M.Y. Goh, Dynamical representation of real numbers and its universality, J. Number Theory. 33(3) (1989), pp. 334–355.
- M. Hénon, A two-dimensional mapping with a strange attractor, Commun. Math. Phys. 50(1) (1976), pp. 69–77.
- K. Ikeda, Multiple-valued stationary state and its instability of the transmitted light by a ring cavity system, Opt. Commun. 30(2) (1979), pp. 257–261.
- G.A. Leonov, Strange Attractors and Classical Stability Theory, St. Petersburg University Press, 2008.160 (ISBN 978-5-288-04500-4).
- T.Y. Li and J Yorke, Period three implies chaos, Am. Math. Mon. 82(10) (1975), pp. 985–992.
- R. Lozi, Un attracteur étrange du type attracteur de Hénon, J. Phys. Colloques. 39(C5) (1978), pp. C5-9–C5-10.
- R. Lozi, Can we trust in numerical computations of chaotic solutions of dynamical systems? Topol. Dyn. Chaos. 84(2013), pp. 63–98. Letellier, Ch. & Gilmore, R., eds, World Scientific Series in Non-linear Science Series A.
- J.R. Miller and J.A. Yorke, Finding all periodic orbits of maps using newton methods: Sizes of basins, Physica. D. 135(3–4) (2000), pp. 195–211.
- O. Morgul, Further stability results for a generalization of delayed feedback control, Nonlinear Dyn. 70 (2012), pp. 1–8.
- E. Ott, C. Grebodgi, and J.A. Yorke, Controlling chaos, Phys. Rev. Lett. 64 (1900), pp. 1196–1199.
- B.T. Polyak, Stabilizing chaos with predictive control, Autom. Remote. Control. 66(11) (2005), pp. 1791–1804.
- K. Pyragas, Continuous control of chaos by self controlling feedback, Phys. Rev. Lett. A. 170(6) (1992), pp. 421–428.
- Y. Qian and W. Meng, Mixed-Mode oscillation in a class of delayed feedback system and multistability dynamic response, Complexity 2019 (2020), pp. 4871068.
- L. Shalby, Predictive feedback control method for stabilization of continuous time systems, Adv. Syst. Sci. Appl. 17 (2017), pp. 1–13.
- T. Ushio and S. Yamamoto, Prediction-based control of chaos, Phys. Lett. A. 264(1) (1999), pp. 30–35.
- D. Yang and J. Zhou, Connections among several chaos feedback control approaches and chaotic vibration control of mechanical systems, Commun. Nonlinear Sci. Numer. Simulat. 19(11) (2014), pp. 3954–3968.
- G. Yuan and A. Yorke, Collapsing of chaos in one dimensional maps, Physica. D. 136(1–2) (2000), pp. 18–30.
- P. Zygliczynski, Computer assisted proof of chaos in the Roessler equations and the Henon map, Nonlinearity 10(1) (1997), pp. 243–252.