Encrypter Information Software Using Chaotic Generators

This document shows a software that shows different chaotic generator, as continuous as discrete time. The software gives the option for obtain the different signals, using different parameters and initial condition value. The program shows then critical parameter for each model. All theses models a...

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Bibliographic Details
Main Authors: Cardoza-Avendaño, L., López-Gutiérrez, R.M., Inzunza-González, E., Cruz-Hernández, C., García-Guerrero, E., Spirin, V., Serrano, H.
Format: Text
Language:English
Published: Zenodo 2009
Subjects:
cryptography
chaotic attractors
software.
Fossen
Mancilla
Sira
Pechora
Online Access:https://dx.doi.org/10.5281/zenodo.1085826
https://zenodo.org/record/1085826
Description
Summary:This document shows a software that shows different chaotic generator, as continuous as discrete time. The software gives the option for obtain the different signals, using different parameters and initial condition value. The program shows then critical parameter for each model. All theses models are capable of encrypter information, this software show it too. : {"references": ["L.M... Pechora and T.L. Carroll, \"Synchronization in chaotic\nsystems,\"Phys. Rev. Lett. 64, 821-824 (1990).", "L. M. Pecora and T. L. Carroll, \"Circuit implementation of\nsynchronizedchaos with applications to communications,\" Phys. Rev. A\n44, (1991).", "Special Issue on Chaos synchronization and control: Theory and\napplications IEEE Trans. Circuits Syst. I, 44, (1997).", "Special Issue on Control and synchronization of chaos, Int. J. Bifurc.\nChaos, 10, (2000).", "C. Cruz-Hern\u251c\u00edndez and H. Nijmeijer, \"Synchronization through\nfiltering,\" Int. J. Bifurc. Chaos, 10, 763-775 (2000). Synchronization\nthrough extended Kalman filtering. In: Nijmeijer H, Fossen TI, editors.\nNew trends in nonlinear observer design. Lecture notes in control and\ninformation sciences, 244 London: Springer; 469-490, (1999).", "H. Sira-Ram\u251c\u00a1rez and C. Cruz-Hern\u251c\u00edndez, \"Synchronization of\nchaotic systems: a generalized Hamiltonian systems approach,\" Int. J.\nBifurc. Chaos, 11, 1381-1395 (2001). And in: Proceedings of the\nAmerican Control Conference, Chicago, USA, 769-773 (2000).", "D. L\u251c\u2502pez-Mancilla and C. Cruz-Hern\u251c\u00edndez, \"Output synchronization\nof chaotic systems: model-matching approach with application to secure\ncommunication,\" Nonlinear Dynamics and Systems Theory, 5, 141-15\n(2005).", "U. Feldmann, M. Hasler and W. Schwarz, \"Communication by\nchaotic signals: the inverse system approach,\" Int. J. Circuits Theory and\nApplications, 24, 551-579 (1996).", "H. Nijmeijer and I. M. Y. Mareels, \"An observer looks\natsynchronization,\" IEEE Trans. Circuits Syst. I, 44, 882-890 (1997).\n[10] Lorenz, E. N. , \"Deterministic nonperiodic flow\". J. Atmos. Sci. 20: 130-\n141. doi:10.1175/1520-0469(1963)020<0130:DNF>2.0.CO;2., (1963).\n[11] Matsumoto, Takashi , \"A Chaotic Attractor from Chua's Circuit\". IEEE\nTransactions on Circuits and Systems (IEEE) CAS-31 (12): 1055-1058.\n(1984).\n[12] Madan, Rabinder N., \"Chua's circuit: a paradigm for chaos\". River\nEdge, N.J.: World Scientific Publishing Company. ISBN 9810213662,\n(1993).\n[13] O. E. R\u00f6ssler, \"An Equation for Continuous Chaos\".\nPhysics Letters 57A (5): 397-398M., (1976).\n[14] H\u00e9non, \"A two-dimensional mapping with a strange attractor\".\nCommunications in Mathematical Physics 50: 69-77.\ndoi:10.1007/BF01608556, (1976).\n[15] Eric W. Weisstein, Logistic Equation at MathWorld.\n[16] R.M. May, \"Simple mathematical models with very complicated\ndynamics\". Nature 261: 459. doi:10.1038/261459a0, 1976"]}

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