Stability of periodic solutions in series arrays of Josephson junctions with internal Capacitance
Abstract
A mystery surrounds the stability properties of the splay-phase periodic solutions to a series array of N Josephson junction oscillators. Contrary to what one would expect from dynamical systems theory, the splay state appears to be neutrally stable for a wide range of system parameters. It has been explained why the splay state must be neutrally stable when the Stewart-McCumber parameter beta is zero. In this paper we complete the explanation of the apparent neutral stability; we show that the splay state is typically hyperbolic -- either asymptotically stable or unstable -- when beta > 0. We conclude that there is only a single unit Floquet multiplier, based on accurate and systematic computations of the Floquet multipliers for beta ranging from 0 to 10. However, N-2 multipliers are extremely close to 1 for beta larger than about 1. In addition, two more Floquet multipliers approach 1 as beta becomes large. We visualize the global dynamics responsible for these nearly degenerate multipliers, and then estimate them accurately by a multiple time-scale analysis. For N=4 junctions the analysis also predicts that the system converges toward either the in-phase state, the splay state, or two clusters of two oscillators, depending on the parameters.
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