Abstract
A circuit consisting of two triggers coupled by a capacitance is studied. The equations of motion are presented with a cubic approximation for the nonlinear terms. It is shown by numerical analysis that chaotic oscillations can be excited. A mechanism for the transition of the oscillations to chaos is described.
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A. S. Dmitriev, A. I. Panas, and S. O. Starkov, Zarubezhnaya Radioélektronika, Uspekhi sovremenno\(\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\smile}$}}{l} \)radioélektroniki, No. 10, 4 (1997).
V. D. Shalfeev et al., Ibid., pp. 27–49.
A. S. Khramov, Pis’ma Zh. Tekh. Fiz. 24(5), 51 (1998) [Tech. Phys. Lett. 24, 189 (1998)].
W. Cunningham, Introduction to the Theory of Nonlinear Systems (Russian translation, Gosénergoizdat, 1962).
L. O. Chua, M. Komuro, and T. Matsumoto, IEEE Control Syst. Mag. CAS-33, 1073 (1986).
C. W. Wu, T. Yang, and L. O. Chua, Int. J. Bifurcation and Chaos 6, 455 (1996).
M. Biey et al., in Proceedings of the 5-th International Specialist Workshop, Nonlinear Dynamics of Electron Systems (NDES’97), June 26–27, 1997, pp. 358–363.
V. V. Astakhov et al., Radiotekh. i élektron., No. 3, 320 (1997).
I. A. Khovanov and V. S. Anishchenko, Radiotekh. i élektron. 42(7), 823 (1997).
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Pis’ma Zh. Tekh. Fiz. 25, 1–6 (March 26, 1999)
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Kal’yanov, É.V. Chaotic oscillations in a system of coupled triggers. Tech. Phys. Lett. 25, 207–208 (1999). https://doi.org/10.1134/1.1262424
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DOI: https://doi.org/10.1134/1.1262424