Applied Koopmanism

TL;DR

This paper introduces the Koopman operator framework as an alternative to traditional state-based dynamical systems analysis, emphasizing its potential for high-dimensional, uncertain, and big data systems, and providing a comprehensive overview of its concepts, methods, and applications.

Contribution

It clarifies the spectral properties of the Koopman operator, unifies various methods under this framework, and offers a concise, accessible overview to facilitate further research and practical adoption.

Findings

Koopman mode analysis enables decomposition of complex dynamics.

Koopman eigenquotients provide insights into system structure.

Continuous indicators of ergodicity help assess system behavior.

Abstract

A majority of methods from dynamical systems analysis, especially those in applied settings, rely on Poincar\'e's geometric picture that focuses on "dynamics of states". While this picture has fueled our field for a century, it has shown difficulties in handling high-dimensional, ill-described, and uncertain systems, which are more and more common in engineered systems design and analysis of "big data" measurements. This overview article presents an alternative framework for dynamical systems, based on the "dynamics of observables" picture. The central object is the Koopman operator: an infinite-dimensional, linear operator that is nonetheless capable of capturing the full nonlinear dynamics. The first goal of this paper is to make it clear how methods that appeared in different papers and contexts all relate to each other through spectral properties of the Koopman operator. The second goal is to present these methods in a concise manner in an effort to make the framework accessible to researchers who would like to apply them, but also, expand and improve them. Finally, we aim to provide a road map through the literature where each of the topics was described in detail. We describe three main concepts: Koopman mode analysis, Koopman eigenquotients, and continuous indicators of ergodicity. For each concept we provide a summary of theoretical concepts required to define and study them, numerical methods that have been developed for their analysis, and, when possible, applications that made use of them. The Koopman framework is showing potential for crossing over from academic and theoretical use to industrial practice. Therefore, the paper highlights its strengths, in applied and numerical contexts. Additionally, we point out areas where an additional research push is needed before the approach is adopted as an off-the-shelf framework for analysis and design.