Litcius/Paper detail

Learning Stable Vector Fields on Lie Groups

Julen Urain, Davide Tateo, Jan Peters

2022IEEE Robotics and Automation Letters20 citationsDOI

Abstract

Learning robot motions from demonstration requires models able to specify vector fields for the full robot pose when the task is defined in operational space. Recent advances in reactive motion generation have shown that learning adaptive, reactive, smooth, and stable vector fields is possible. However, these approaches define vector fields on a flat Euclidean manifold, while representing vector fields for orientations requires modeling the dynamics in non-Euclidean manifolds, such as Lie Groups. In this paper, we present a novel vector field model that can guarantee most of the properties of previous approaches i.e., stability, smoothness, and reactivity beyond the Euclidean space. In the experimental evaluation, we show the performance of our proposed vector field model to learn stable vector fields for full robot poses as SE(2) and SE(3) in both simulated and real robotics tasks.

Topics & Concepts

Vector fieldSmoothnessEuclidean spaceArtificial intelligenceStability (learning theory)Manifold (fluid mechanics)Euclidean geometryLie groupFundamental vector fieldField (mathematics)Vector spaceLie bracket of vector fieldsComputer scienceRoboticsRobotMathematicsPure mathematicsMathematical analysisMachine learningEngineeringGeometryAdjoint representation of a Lie algebraMechanical engineeringLie conformal algebraRobot Manipulation and LearningRobotic Mechanisms and DynamicsRobotic Locomotion and Control