Abstract

Abstract. In this paper we consider fluid transport in two-dimensional flows from the dynamical systems point of view, with the focus on elliptic behaviour and aperiodic and finite time dependence. We give an overview of previous work on general nonautonomous and finite time vector fields with the purpose of bringing to the attention of those working on fluid transport from the dynamical systems point of view a body of work that is extremely relevant, but appears not to be so well known. We then focus on the Kolmogorov–Arnold–Moser (KAM) theorem and the Nekhoroshev theorem. While there is no finite time or aperiodically time-dependent version of the KAM theorem, the Nekhoroshev theorem, by its very nature, is a finite time result, but for a "very long" (i.e. exponentially long with respect to the size of the perturbation) time interval and provides a rigorous quantification of "nearly invariant tori" over this very long timescale. We discuss an aperiodically time-dependent version of the Nekhoroshev theorem due to Giorgilli and Zehnder (1992) (recently refined by Bounemoura, 2013 and Fortunati and Wiggins, 2013) which is directly relevant to fluid transport problems. We give a detailed discussion of issues associated with the applicability of the KAM and Nekhoroshev theorems in specific flows. Finally, we consider a specific example of an aperiodically time-dependent flow where we show that the results of the Nekhoroshev theorem hold.

Highlights

  • This paper is concerned with “Kolmogorov, Arnold, Moser (KAM) like behavior” in two-dimensional, incompressible, aperiodically time-dependent velocity fields over a finite time interval

  • The velocity field can be kinematically defined, dynamically defined, or it could be obtained by observation

  • In this paper we have considered fluid transport in twodimensional flows from the dynamical systems point of view, with the focus on elliptic behaviour and aperiodic and finite time dependence

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Summary

Introduction

This paper is concerned with “Kolmogorov, Arnold, Moser (KAM) like behavior” in two-dimensional, incompressible, aperiodically time-dependent velocity fields over a finite time interval. Armed with the point of view described in Aref (1984), one could “see” that phase space structures such as elliptic periodic orbits, hyperbolic periodic orbits and their stable and unstable manifolds, and KAM tori had an immediate interpretation in terms of “structures” in the flow influencing transport and mixing. In this way dynamical systems theory provided an analytical and computational meaning for the notion of “coherent structures” in fluid flows that was becoming a frequent observation in experiments due to advances in flow visualization capabilities

Nonautonomous dynamical systems
Finite time dynamical systems
The KAM theorem and sufficient conditions for its application
The Nekhoroshev theorem and sufficient conditions for its application
Application of the KAM and Nekhoroshev theorems to fluid transport
The Nekhoroshev theorem for aperiodic time dependence
An example
A quasiperiodic time dependence:
Conclusions and outlook

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