Multiple nested basin boundaries in nonlinear driven oscillators☆

Abstract A special type of basins of attraction for high-period coexisting attractors is investigated, which basin boundaries possess multiple nested structures in a driven oscillator. We analyze the global organization of basins and discuss the mechanism for the appearance of layered structures. The unstable periodic orbits and unstable limit cycle are also detected in the oscillator. The basin organization is governed by the ordering of regular saddles and the regular saddle connections are the interrupted by the unstable limit cycle. Wada basin boundary with different Wada number is discovered. Wada basin boundaries for the hidden and rare attractors are also verified.

[1]  Tomasz Kapitaniak,et al.  Multistability: Uncovering hidden attractors , 2015, The European Physical Journal Special Topics.

[2]  Nikolay V. Kuznetsov,et al.  Hidden attractor in smooth Chua systems , 2012 .

[3]  Grebogi,et al.  Map with more than 100 coexisting low-period periodic attractors. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[4]  Ott,et al.  Saddle-node bifurcations on fractal basin boundaries. , 1995, Physical review letters.

[5]  S. Smale Differentiable dynamical systems , 1967 .

[6]  Nikolay V. Kuznetsov,et al.  Hidden attractor and homoclinic orbit in Lorenz-like system describing convective fluid motion in rotating cavity , 2015, Commun. Nonlinear Sci. Numer. Simul..

[7]  James A. Yorke,et al.  Wada basin boundaries and basin cells , 1996 .

[8]  Ulrike Feudel,et al.  Complex Dynamics in multistable Systems , 2008, Int. J. Bifurc. Chaos.

[9]  Celso Grebogi,et al.  Multistability, Basin Boundary Structure, and Chaotic Behavior in a Suspension Bridge Model , 2004, Int. J. Bifurc. Chaos.

[10]  Alexander N. Pisarchik,et al.  Stochastic control of attractor preference in a multistable system , 2012 .

[11]  Erik Mosekilde,et al.  Multistability and hidden attractors in a relay system with hysteresis , 2015 .

[12]  J. Yorke,et al.  Finding safety in partially controllable chaotic systems , 2012 .

[13]  Basin boundaries with nested structure in a shallow arch oscillator , 2014 .

[14]  Nikolay V. Kuznetsov,et al.  On differences and similarities in the analysis of Lorenz, Chen, and Lu systems , 2014, Appl. Math. Comput..

[15]  Eschenazi,et al.  Basins of attraction in driven dynamical systems. , 1989, Physical review. A, General physics.

[16]  Guanwei Luo,et al.  Wada basin dynamics of a shallow arch oscillator with more than 20 coexisting low-period periodic attractors , 2014 .

[17]  M. Sanjuán,et al.  Unpredictable behavior in the Duffing oscillator: Wada basins , 2002 .

[18]  T. N. Mokaev,et al.  Homoclinic orbits, and self-excited and hidden attractors in a Lorenz-like system describing convective fluid motion Homoclinic orbits, and self-excited and hidden attractors , 2015 .

[19]  U. Feudel,et al.  Control of multistability , 2014 .

[20]  Miguel A. F. Sanjuán,et al.  Controlling unpredictability in the randomly driven Hénon-Heiles system , 2013, Commun. Nonlinear Sci. Numer. Simul..

[21]  Wanda Szemplińska-Stupnicka,et al.  Effects of Multi Global Bifurcations on Basin Organization, Catastrophes and Final Outcomes in a Driven Nonlinear Oscillator at the 2T-Subharmonic Resonance , 1998 .

[22]  Przemyslaw Perlikowski,et al.  Multistability and Rare attractors in van der Pol-Duffing oscillator , 2011, Int. J. Bifurc. Chaos.