Journal of Engineering and Applied Sciences
Year:
2018
Volume:
13
Issue:
13
Page No.
4859 - 4865
Precise Long-Term Prediction of Behavior in a 3-D Chaotic Map
Authors :
M.Mammeri
References
Arrow, K.J., R. Forsythe, M. Gorham, R. Hahn and R. Hanson
et al., 2008. The promise of prediction markets. Sci. N. Y. Washington, 320: 877-878.
Boettiger, C. and A. Hastings, 2013. Tipping points: From patterns to predictions. Nat., 493: 157-158.
CrossRef | Direct Link | Chua, L.O., M. Komuro and T. Matsumoto, 1986. The double scroll family. IEEE Trans. Circuits Syst., 33: 1072-1118.
CrossRef | Dauwels, J., F. Vialatte, C. Latchoumane, J. Jeong and A. Cichocki, 2009. EEG synchrony analysis for early diagnosis of Alzheimer's disease: A study with several synchrony measures and EEG data sets. Proceedings of the Annual IEEE International Conference on Engineering in Medicine and Biology Society EMBC, September 3-6, 2009, IEEE, Minneapolis, Minnesota,, ISBN:978-1-4244-3296-7, pp: 2224-2227.
Dullin, H.R. and J.D. Meiss, 2000. Generalized Henon maps: The cubic diffeomorphisms of the plane. Phys. D. Nonlinear Phenom., 143: 262-289.
Direct Link | Gonchenko, S.V., I.I. Ovsyannikov, C. Simo and D. Turaev, 2005. Three-dimensional Henon-like maps and wild Lorenz-like attractors. Intl. J. Bifurcation Chaos, 15: 3493-3508.
CrossRef | Direct Link | Gonchenko, S.V., J.D. Meiss and I.I. Ovsyannikov, 2006. Chaotic dynamics of three-dimensional Henon maps that originate from a homoclinic bifurcation. Regul. Chaotic Dyn., 11: 191-212.
Direct Link | Gonchenko, S.V., V.S. Gonchenko and J.C. Tatjar, 2007. Bifurcation of three-dimensional diseomorphisms non-simple quadratic homoclinic tangencies and generalized henon maps. Regul. Chaotic Dyn., 12: 233-266.
Direct Link | Hu, W., G.H. Zhao, G. Zhang, J.Q. Zhang and X.L. Liu, 2012. Stabilities and bifurcations of sine dynamic equations on time scale. Acta Phys. Sin., Vol. 61,
Jeong, J., 2002. Nonlinear dynamics of EEG in Alzheimer’s disease. Drug Dev. Res., 56: 57-66.
CrossRef | Direct Link | Lehnertz, K. and C.E. Elger, 1998. Can epileptic seizures be predicted? Evidence from nonlinear time series analysis of brain electrical activity. Phys. Rev. Lett., 80: 5019-5022.
CrossRef | Direct Link | Lorenz, E.N., 1963. Deterministic non-periodic flow. J. Atmos. Sci., 20: 130-141.
Direct Link | Lu, J. and G. Chen, 2002. A new chaotic attractor coined. Int. J. Bifurcation Chaos, 12: 659-661.
CrossRef | Direct Link | Mammeri, M., 2016. A large chaotic region in a 3-D sinusoid discrete map. Intl. J. Appl. Math. Stat., 55: 133-144.
Mandal, K., S. Banerjee and C. Chakraborty, 2011. Symmetry-breaking bifurcation in load resonant DC-DC converters. Proceedings of the IEEE International Symposium on Circuits and Systems (ISCAS), May 15-18, 2011, IEEE, Rio de Janeiro, Brazil, ISBN:978-1-4244-9473-6, pp: 1327-1330.
Mandal, K., S. Banerjee and C. Chakraborty, 2013. Symmetry-breaking bifurcation in series-parallel load resonant DC-DC converters. IEEE. Trans. Circuits Syst. Regul. Pap., 60: 778-787.
CrossRef | Direct Link | Ogata, K., 1995. Discrete-Time Control Systems. 2nd Edn., Prentice Hall, Upper Saddle River, New Jersey,USA., ISBN:9780133286427, Pages: 745.
Romanelli, L., M.A. Figliola and F.A. Hirsch, 1988. Deterministic chaos and natural phenomena. J. Stat. Phys., 53: 991-994.
Direct Link | Rossler, O.E., 1976. An equation for continuous chaos. Phys. Lett. A, 57: 397-398.
CrossRef | Direct Link |