Chaos and unstable periodic orbits in subcritical Taylor-Couette flow

ORAL

Abstract

Although spectral approximation of turbulence typically requires a large number of modes, for relatively low Reynolds numbers the turbulent attractor lies on a low-dimensional manifold in phase space. The most extreme case is when the main features of the chaotic attractor can be quantified by a one-dimensional map on Poincaré section. We find this can indeed happen in subcritical Taylor-Couette flow, which should offer an important test case for connecting turbulence and periodic orbit analysis.

*This work was supported by Australian Research Council Discovery Project (DP230102188), the Spanish Ministerio de Economía y Competitivdad (FIS2016-77849-R, FIS2017-85794-P), Ministerio de Ciencia e Innovación (PID2020-114043GB-I00), and the Generalitat de Catalunya (grant 2017-SGR-785).

Presenters

  • Kengo Deguchi

    • Monash University

Authors

  • Kengo Deguchi

    • Monash University

  • Baoying Wang

    • Universitat Politecnica de Catalunya

  • Roger Ayats

    • Institute of Science and Technology Austria

  • Fernando Mellibovsky

    • Universitat Politecnica de Catalunya

  • Alvaro Meseguer

    • Universitat Politecnica de Catalunya