Abstract
In this paper, we have analysed the dynamical behavior of the Josephson Junction equation by numerical computation and the theory of dynamical systems. As 0<β<2/1+e, andρ is not sufficiently large, we observed the intermittent chaotic behavior and the period-doubling chaotic behavior in which people are very interested recently. This implies that for someβ(0<β<2/1+e), the dynamical behavior of the J-J equation is rather complex.
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