Optimal phase description of chaotic oscillators

Justus T. C. Schwabedal, Arkady Pikovsky, Björn Kralemann, and Michael Rosenblum

Phys. Rev. E 85, 026216 – Published 27 February 2012

Abstract

We introduce an optimal phase description of chaotic oscillations by generalizing the concept of isochrones. On chaotic attractors possessing a general phase description, we define the optimal isophases as Poincaré surfaces showing return times as constant as possible. The dynamics of the resultant optimal phase is maximally decoupled from the amplitude dynamics and provides a proper description of the phase response of chaotic oscillations. The method is illustrated with the Rössler and Lorenz systems.

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Received 19 October 2011

DOI:https://doi.org/10.1103/PhysRevE.85.026216

Authors & Affiliations

Justus T. C. Schwabedal^1,2,*, Arkady Pikovsky², Björn Kralemann³, and Michael Rosenblum²

¹Department of Physiology, Marburg University, D-35037 Marburg, Germany
²Department of Physics and Astronomy, Potsdam University, D-14476 Potsdam, Germany
³Department of Education Science, Christian-Albrechts-University Kiel, D-24118 Kiel, Germany

^*jschwabedal@googlemail.com

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Vol. 85, Iss. 2 — February 2012

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Physical Review E

covering statistical, nonlinear, biological, and soft matter physics