Low-cost Microcontroller-based Reconfigurable High-complex Chaotic Generator
Article Sidebar
Main Article Content
Abstract
This paper proposed a microcontroller-based high-complex chaotic generator. The proposed chaotic system can generate three different attractors, including 2-scroll, 3-scroll, and high-complex chaotic 4-scroll. The low-cost components include a microcontroller, R2R Ladder, and switches. In chaotic generator uses the modified jerk-based algorithm, which can independently reconfigure the parameters of the nonlinear functions. The experimental and numerical MATLAB simulation results are exhibited and compared, which are agreeable performances. Finally, the proposed system is conveniently applied in many engineering areas, such as cryptography, random robotics, etc.
Article Details
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
Journal of TCI is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International (CC BY-NC-ND 4.0) licence, unless otherwise stated. Please read our Policies page for more information...
References
E N. Lorenz, "Deterministic nonperiodic flow," J. Atmos. Sci., vol.20, no.2, pp. 130-141, 1963.
O. E. Rössler, "An Equation for Continuous Chaos," Physics Letters, vol.57A, no. 5, pp. 397-398, 1976.
J.C. Sprott, "A New Class of Chaotic Circuit," Physics Letters A. vol. 266, pp.19-23, 2000.
J. Katz, and Y. Lindell, "Introduction to modern cryptography," New York, Taylor & Francis Group, 2008.
K. Karawanich, M. Kumngern, J. Chimnoy, and P. Prommee, "A four-scroll chaotic generator based on two nonlinear functions and its telecommunications cryptography application," Int. J. Electron. Commun. (AEU), vol. 157, 154439, 2022.
K. Karawanich, and P. Prommee, "High-complex chaotic system based on new nonlinear function and OTA-based circuit realization," Chaos. Solit. Frac. Vol.162, 112536, 2022.
R. Chiuab, M. Mora-Gonzaleza, D. Lopez-Mancillaa" Implementation of a Chaotic Oscillator into a Simple Microcontroller" IERI Procedia, Vol.4, pp.247-252, 2013
A. Wolf, J.B. Swift, H.L. Swinney, and J.A. Vastano, "Determining Lyapunov exponents from a time series," Phys. D., vol. 16, pp.285-317, 1985.
S.H. Strogatz, "Nonlinear dynamics and chaos," Taylor & Francis Group, 1994.
Li, C., Sprott J.C., Yuan, Z.Y., Li, H. Constructing chaotic systems with Total amplitude control. Int. J. Bifurcation Chaos. 2015 25(10):1530025.
