Amortized Equation Discovery in Hybrid Dynamical Systems

Yongtuo Liu, Sara Magliacane, Miltiadis Kofinas, Efstratios Gavves
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Abstract

Hybrid dynamical systems are prevalent in science and engineering to express complex systems with continuous and discrete states. To learn the laws of systems, all previous methods for equation discovery in hybrid systems follow a two-stage paradigm, i.e. they first group time series into small cluster fragments and then discover equations in each fragment separately through methods in non-hybrid systems. Although effective, these methods do not fully take advantage of the commonalities in the shared dynamics of multiple fragments that are driven by the same equations. Besides, the two-stage paradigm breaks the interdependence between categorizing and representing dynamics that jointly form hybrid systems. In this paper, we reformulate the problem and propose an end-to-end learning framework, i.e. Amortized Equation Discovery (AMORE), to jointly categorize modes and discover equations characterizing the dynamics of each mode by all segments of the mode. Experiments on four hybrid and six non-hybrid systems show that our method outperforms previous methods on equation discovery, segmentation, and forecasting.
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混合动力系统中的摊销方程发现
混合动力系统在科学和工程领域非常普遍,用于表达具有连续和离散状态的复杂系统。为了学习系统的规律,以往在混合系统中发现方程的所有方法都遵循两阶段范式,即首先将时间序列分组为小的簇片段,然后通过非混合系统的方法分别发现每个片段中的方程。这些方法虽然有效,但不能充分利用由相同方程驱动的多个片段的共同动态的共性。此外,两阶段范式打破了共同构成混合系统的动力学分类和表示之间的相互依存关系。在本文中,我们重新阐述了这个问题,并提出了一个端到端的学习框架,即摊销方程发现(AMORE),以联合分类模式,并通过模式的所有分段发现描述每个模式动态的方程。在四个混合系统和六个非混合系统上的实验表明,我们的方法在方程发现、分段和预测方面优于之前的方法。
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