论文信息 - A computer-assisted proof of chaos in Josephson junctions

A computer-assisted proof of chaos in Josephson junctions

Abstract This paper presents a rigorous verification of chaos in the RCLSJ model for studying dynamics of the Josephson junction. By carefully picking a suitable cross-section with respect to the attractor, it is shown that for the corresponding Poincare map P obtained in terms of second return time, there exists a closed invariant set Λ in this cross-section such that P∣Λ is semi-conjugate to a 2-shift map, thus showing existence of chaos in the RCLSJ model.

Qingdu Li | Xiao-Song Yang | Xiao-Song Yang | Qingdu Li

[1] S. Wiggins. Introduction to Applied Nonlinear Dynamical Systems and Chaos , 1989 .

[2] M. G. Forrester,et al. Effect of inductance in externally shunted Josephson tunnel junctions , 1995 .

[3] Xiao-Song Yang,et al. Horseshoes in piecewise continuous maps , 2004 .

[4] James P. Crutchfield,et al. Noise phenomena in Josephson junctions , 1980 .

[5] Whan Cb,et al. Complex dynamical behavior in RCL-shunted Josephson tunnel junctions. , 1996 .

[6] Syamal K. Dana,et al. Chaotic dynamics in Josephson junction , 2001 .

[7] A. B. Cawthorne,et al. Complex dynamics of resistively and inductively shunted Josephson junctions , 1998 .