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Asymptotic Phase and Amplitude for Classical and Semiclassical Stochastic Oscillators via Koopman Operator Theory

Author

Listed:
  • Yuzuru Kato

    (Department of Systems and Control Engineering, Tokyo Institute of Technology, O-okayama 2-12-1-W8-16, Tokyo 152-8552, Japan)

  • Jinjie Zhu

    (Department of Systems and Control Engineering, Tokyo Institute of Technology, O-okayama 2-12-1-W8-16, Tokyo 152-8552, Japan
    School of Mechanical Engineering, Nanjing University of Science and Technology, Nanjing 210094, China)

  • Wataru Kurebayashi

    (Institute for Promotion of Higher Education, Hirosaki University, Aomori 036-8560, Japan)

  • Hiroya Nakao

    (Department of Systems and Control Engineering, Tokyo Institute of Technology, O-okayama 2-12-1-W8-16, Tokyo 152-8552, Japan)

Abstract

The asymptotic phase is a fundamental quantity for the analysis of deterministic limit-cycle oscillators, and generalized definitions of the asymptotic phase for stochastic oscillators have also been proposed. In this article, we show that the asymptotic phase and also amplitude can be defined for classical and semiclassical stochastic oscillators in a natural and unified manner by using the eigenfunctions of the Koopman operator of the system. We show that the proposed definition gives appropriate values of the phase and amplitude for strongly stochastic limit-cycle oscillators, excitable systems undergoing noise-induced oscillations, and also for quantum limit-cycle oscillators in the semiclassical regime.

Suggested Citation

  • Yuzuru Kato & Jinjie Zhu & Wataru Kurebayashi & Hiroya Nakao, 2021. "Asymptotic Phase and Amplitude for Classical and Semiclassical Stochastic Oscillators via Koopman Operator Theory," Mathematics, MDPI, vol. 9(18), pages 1-18, September.
    • Handle: RePEc:gam:jmathe:v:9:y:2021:i:18:p:2188-:d:630990
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