Title :
Rigorous analyses of windows in a symmetric circuit
Author :
Nishio, Yoshifumi ; Inaba, Naohiko ; Mori, Shinsaku ; Saito, Toshimichi
Author_Institution :
Dept. of Electr. Eng., Keio Univ., Yokohama, Japan
fDate :
4/1/1990 12:00:00 AM
Abstract :
Two types of windows are found in a symmetric circuit that cannot be seen in the logistic map and are inherent in the symmetric structure of this circuit. One type of window exhibits complex bifurcation phenomena such as symmetry breaking and symmetry recovering in its own region, while the other type of window appears when one chaotic attractor bifurcates to two periodic attractors. The authors derive a one-dimensional Poincare map from the circuit by the degeneration technique and prove rigorously that the two types of windows appear alternatively and infinitely many times inside some windows by applying a certain scaling mechanism on the Poincare map
Keywords :
chaos; equivalent circuits; negative resistance; nonlinear network analysis; chaotic attractor; complex bifurcation phenomena; degeneration technique; one-dimensional Poincare map; periodic attractors; scaling mechanism; symmetric circuit; symmetry breaking; symmetry recovering; windows analysis; Bifurcation; Chaos; Circuit testing; Differential equations; Information science; Logistics; Magnetooptic recording; Mathematical model; Nonlinear equations; Piecewise linear techniques;
Journal_Title :
Circuits and Systems, IEEE Transactions on
