Active Symbolic Discovery of Ordinary Differential Equations via Phase Portrait Sketching

Nan Jiang, Md Nasim, Yexiang Xue
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Abstract

Discovering Ordinary Differential Equations (ODEs) from trajectory data is a crucial task in AI-driven scientific discovery. Recent methods for symbolic discovery of ODEs primarily rely on fixed training datasets collected a-priori, often leading to suboptimal performance, as observed in our experiments in Figure 1. Inspired by active learning, we explore methods for querying informative trajectory data to evaluate predicted ODEs, where data are obtained by the specified initial conditions of the trajectory. Chaos theory indicates that small changes in the initial conditions of a dynamical system can result in vastly different trajectories, necessitating the maintenance of a large set of initial conditions of the trajectory. To address this challenge, we introduce Active Symbolic Discovery of Ordinary Differential Equations via Phase Portrait Sketching (APPS). Instead of directly selecting individual initial conditions, APPS first identifies an informative region and samples a batch of initial conditions within that region. Compared to traditional active learning methods, APPS eliminates the need for maintaining a large amount of data. Extensive experiments demonstrate that APPS consistently discovers more accurate ODE expressions than baseline methods using passively collected datasets.
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通过相位肖像素描主动符号化发现常微分方程
从轨迹数据中发现常微分方程(ODE)是人工智能驱动的科学发现中的一项重要任务。最近用于符号发现 ODE 的方法主要依赖于事先收集的固定训练数据集,这往往会导致性能不理想,正如我们在图 1 中的实验所观察到的那样。受主动学习的启发,我们探索了查询信息轨迹数据以评估预测的 ODE 的方法,其中数据是通过指定的轨迹初始条件获得的。混沌理论表明,动态系统初始条件的微小变化都可能导致轨迹的巨大差异,因此有必要维护大量的轨迹初始条件集。为了应对这一挑战,我们引入了通过相位肖像草图(APPS)主动发现常微分方程的符号方法(Active Symbolic Discovery of Ordinary Differential Equations viaPhase Portrait Sketching)。APPS 不直接选择单个初始条件,而是首先确定一个信息区域,然后在该区域内对一批初始条件进行采样。与传统的主动学习方法相比,APPS 无需维护大量数据。大量实验证明,与使用被动收集数据集的基线方法相比,APPS 始终能发现更精确的 ODE 表达式。
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