TL;DR
This paper introduces a novel variational learning method for dynamical systems that only requires position data, recovering unobserved quantities and correcting discretization errors to accurately model physical systems.
Contribution
The work presents a new approach that incorporates variational principles into data-driven dynamical system learning without needing velocity data or prior variational knowledge.
Findings
Successfully recovers unobserved velocities using backward error analysis.
Compensates for discretization errors in trajectory predictions.
Enables system identification from position-only data.
Abstract
The principle of least action is one of the most fundamental physical principle. It says that among all possible motions connecting two points in a phase space, the system will exhibit those motions which extremise an action functional. Many qualitative features of dynamical systems, such as the presence of conservation laws and energy balance equations, are related to the existence of an action functional. Incorporating variational structure into learning algorithms for dynamical systems is, therefore, crucial in order to make sure that the learned model shares important features with the exact physical system. In this paper we show how to incorporate variational principles into trajectory predictions of learned dynamical systems. The novelty of this work is that (1) our technique relies only on discrete position data of observed trajectories. Velocities or conjugate momenta do {\em…
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