Data-driven linearization of dynamical systems.

IF 5.2 2区 工程技术 Q1 ENGINEERING, MECHANICAL Nonlinear Dynamics Pub Date : 2024-01-01 Epub Date: 2024-08-15 DOI:10.1007/s11071-024-10026-x
George Haller, Bálint Kaszás
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Abstract

Dynamic mode decomposition (DMD) and its variants, such as extended DMD (EDMD), are broadly used to fit simple linear models to dynamical systems known from observable data. As DMD methods work well in several situations but perform poorly in others, a clarification of the assumptions under which DMD is applicable is desirable. Upon closer inspection, existing interpretations of DMD methods based on the Koopman operator are not quite satisfactory: they justify DMD under assumptions that hold only with probability zero for generic observables. Here, we give a justification for DMD as a local, leading-order reduced model for the dominant system dynamics under conditions that hold with probability one for generic observables and non-degenerate observational data. We achieve this for autonomous and for periodically forced systems of finite or infinite dimensions by constructing linearizing transformations for their dominant dynamics within attracting slow spectral submanifolds (SSMs). Our arguments also lead to a new algorithm, data-driven linearization (DDL), which is a higher-order, systematic linearization of the observable dynamics within slow SSMs. We show by examples how DDL outperforms DMD and EDMD on numerical and experimental data.

Supplementary information: The online version contains supplementary material available at 10.1007/s11071-024-10026-x.

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数据驱动的动力系统线性化。
动态模态分解(DMD)及其变体,如扩展动态模态分解(EDMD),被广泛用于将简单的线性模型拟合到从可观测数据中已知的动力系统中。由于 DMD 方法在一些情况下效果很好,但在另一些情况下却表现不佳,因此有必要澄清 DMD 适用的假设条件。仔细观察,现有的基于库普曼算子的 DMD 方法解释并不令人满意:这些解释证明了 DMD 在一些假设条件下的合理性,而这些假设条件对于一般观测数据来说,其成立概率为零。在这里,我们给出了 DMD 的理由,即在一般观测变量和非退化观测数据的概率为一的条件下,DMD 是主导系统动力学的局部领先阶缩小模型。对于有限维或无限维的自主系统和周期受迫系统,我们通过在吸引慢速谱子曼弗雷德(SSM)内构建其主导动力学的线性化变换来实现这一点。我们的论证还引出了一种新算法--数据驱动线性化(DDL),它是对慢速 SSM 内可观测动力学的高阶、系统线性化。我们通过实例展示了 DDL 在数值和实验数据上如何优于 DMD 和 EDMD:在线版本包含补充材料,可查阅 10.1007/s11071-024-10026-x。
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来源期刊
Nonlinear Dynamics
Nonlinear Dynamics 工程技术-工程:机械
CiteScore
9.00
自引率
17.90%
发文量
966
审稿时长
5.9 months
期刊介绍: Nonlinear Dynamics provides a forum for the rapid publication of original research in the field. The journal’s scope encompasses all nonlinear dynamic phenomena associated with mechanical, structural, civil, aeronautical, ocean, electrical, and control systems. Review articles and original contributions are based on analytical, computational, and experimental methods. The journal examines such topics as perturbation and computational methods, symbolic manipulation, dynamic stability, local and global methods, bifurcations, chaos, and deterministic and random vibrations. The journal also investigates Lie groups, multibody dynamics, robotics, fluid-solid interactions, system modeling and identification, friction and damping models, signal analysis, and measurement techniques.
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