A Physics-Informed Gaussian Process Regression Algorithm for the Dynamics of the Planar Pendulum
- Resource Type
- Conference
- Authors
- Li, Tianzhi; Wang, Jinzhi
- Source
- 2023 42nd Chinese Control Conference (CCC) Chinese Control Conference (CCC), 2023 42nd. :5163-5167 Jul, 2023
- Subject
- Computing and Processing
Robotics and Control Systems
Signal Processing and Analysis
Transportation
Heuristic algorithms
Gaussian processes
Machine learning
Differential equations
Prediction algorithms
Solids
Mechanical factors
Gaussian process regression
Hamel's formalism
physics-informed learning
variational integrator
- Language
- ISSN
- 1934-1768
Gaussian process regression has received considerable attention due to its performance in solving the problem of learning and predicting the dynamics of certain systems in the machine learning area. However, this data-driven method ignores the prior physical information. A feasible method to tackle this problem is to embed prior dynamics into the Gaussian process regression. This naturally relies on numerical discretizations of continuous-time differential equations that describe the dynamics. However, conventional discretization schemes do not respect the intrinsic geometric structure of the system, which plays an important role when analyzing the properties of the mechanical system. In this work, we develop a physic-informed Gaussian process regression algorithm based on Hamel's formalism and its variational integrator. Computational properties are illustrated by the numerical experiment of learning and predicting the dynamics of a planar pendulum.