Novel bifurcation structure generated in piecewise-linear three- resonant circuit and its Lyapunov analysis

We analyse a piecewise-linear oscillator that consists of a three- L C resonant circuit with a hysteresis element. Three sets of two-dimensional linear equations, including a hysteresis function, represent the governing equations of the circuit, and all the Lyapunov exponents are calculated in a remarkably simple manner based on derived explicit solutions. Various dynamical phenomena such as two-torus, three-torus, and hyperchaos with four positive Lyapunov exponents are observed by Lyapunov analysis. We obtained a detailed bifurcation diagram in which novel bifurcation structure which we call a atwo-torus Arnold tonguea is observed where two-torus generating regions exist in a three-torus generating region as if periodic states exist in a two-torus generating region.