Related papers: Physically Consistent Learning of Conservative Lagrangian Systems with Gaussian Processes

Physically Consistent Learning of Conservative Lagrangian Systems with Gaussian Processes

URL: http://arxiv.org/abs/2206.12272v1
Date: Fri, 24 Jun 2022 13:15:43 GMT
Title: Physically Consistent Learning of Conservative Lagrangian Systems with Gaussian Processes
Authors: Giulio Evangelisti and Sandra Hirche
Abstract summary: This paper proposes a physically consistent Gaussian Process (GP) enabling the identification of uncertain Lagrangian systems. The function space is tailored according to the energy components of the Lagrangian and the differential equation structure.
Score: 7.678864239473703
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: This paper proposes a physically consistent Gaussian Process (GP) enabling the identification of uncertain Lagrangian systems. The function space is tailored according to the energy components of the Lagrangian and the differential equation structure, analytically guaranteeing physical and mathematical properties such as energy conservation and quadratic form. The novel formulation of Cholesky decomposed matrix kernels allow the probabilistic preservation of positive definiteness. Only differential input-to-output measurements of the function map are required while Gaussian noise is permitted in torques, velocities, and accelerations. We demonstrate the effectiveness of the approach in numerical simulation.

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