Chaotic dynamics of Josephson equation driven by constant dc and ac forcings
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Publication:5950564
DOI10.1016/S0960-0779(00)00245-9zbMath0994.70018MaRDI QIDQ5950564
Publication date: 2 January 2002
Published in: Chaos, Solitons and Fractals (Search for Journal in Brave)
saddle pointsheteroclinic orbitshomoclinic orbitsMelnikov methodcurrent forcingexistence of chaosshifted phasesingle point contact Josephson equation
Transition to stochasticity (chaotic behavior) for nonlinear problems in mechanics (70K55) Technical applications of optics and electromagnetic theory (78A55) Homoclinic and heteroclinic trajectories for nonlinear problems in mechanics (70K44)
Related Items (6)
Heteroclinic orbits and chaotic regions for Josephson system ⋮ Bifurcations of periodic orbits in three-well Duffing system with a phase shift ⋮ Complex dynamics in Josephson system with two external forcing terms ⋮ The Effects of a Constant Excitation Force on the Dynamics of an Infinite-Equilibrium Chaotic System Without Linear Terms: Analysis, Control and Circuit Simulation ⋮ The Effects of Symmetry Breaking Perturbation on the Dynamics of a Novel Chaotic System with Cyclic Symmetry: Theoretical Analysis and Circuit Realization ⋮ Reversal of period doubling, multistability and symmetry breaking aspects for a system composed of a van der Pol oscillator coupled to a Duffing oscillator
Cites Work
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- Horseshoe-shaped maps in chaotic dynamics of long Josephson junction driven by biharmonic signals
- Criteria for chaos of a three-well potential oscillator with homoclinic and heteroclinic orbits
- Limit Cycles in the Josephson Equation
- Melnikov’s Method at a Saddle-Node and the Dynamics of the Forced Josephson Junction
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