Intermittency transitions to strange nonchaotic attractors in a
  quasiperiodically driven Duffing oscillator

A. Bondeson; A. Prasad; A. Prasad; A. Prasad; A. Prasad; A. S. Pikovsky; A. S. Pikovsky; A. Venkatesan; A. Venkatesan; A. Venkatesan; A. Venkatesan; C. Grebogi; C. Grebogi; E. Ott; F. J. Romeiras; F. J. Romeiras; G. Benettin; H. D. I. Abarbanel; H. G. Schuster; H. T. Savage; H. T. Savage; H. T. Savage; J. E. Hirsch; J. F. Heagy; J. F. Heagy; K. Kaneko; M. Ding; M. Ding; M. Dubois; M. Lakshmanan; M. Lakshmanan; O. Sosnovtseva; P. Grassberger; P. Grassberger; R. Ramaswamy; R. Ramaswamy; S. P. Kuznetsov; T. Kapitaniak; T. Kapitaniak; T. Kapitaniak; T. Nishikawa; T. Yalçinkaya; T. Zhou; U. Feudel; V. S. Anishchensko; W. L. Ditto; W. L. Ditto; W. X. Ding; Y. C. Lai; Y. C. Lai; Y. Pomeau

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Intermittency transitions to strange nonchaotic attractors in a quasiperiodically driven Duffing oscillator

Abstract

Different mechanisms for the creation of strange nonchaotic attractors (SNAs) are studied in a two-frequency parametrically driven Duffing oscillator. We focus on intermittency transitions in particular, and show that SNAs in this system are created through quasiperiodic saddle-node bifurcations (Type-I intermittency) as well as through a quasiperiodic subharmonic bifurcation (Type-III intermittency). The intermittent attractors are characterized via a number of Lyapunov measures including the behavior of the largest nontrivial Lyapunov exponent and its variance as well as through distributions of finite-time Lyapunov exponents. These attractors are ubiquitous in quasiperiodically driven systems; the regions of occurrence of various SNAs are identified in a phase diagram of the Duffing system.Comment: 24 pages, RevTeX 4, 12 EPS figure

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