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Contact-Implicit Trajectory Optimization With Learned Deformable Contacts Using Bilevel Optimization

Yifan Zhu, Zherong Pan, Kris Hauser

Year
2021
Citations
11

Abstract

We present a bilevel, contact-implicit trajectory optimization (TO) formulation that searches for robot trajectories with learned soft contact models. On the lower-level, contact forces are solved via a quadratic program (QP) with the maximum dissipation principle (MDP), based on which the dynamics constraints are formulated in the upper-level TO problem that uses direct transcription. Our method uses a contact model for granular media that is learned from physical experiments, but is general to any contact model that is stick-slip, convex, and smooth. We employ a primal interior-point method with a pre-specified duality gap to solve the lower-level problem, which provides robust gradient information to the upper-level problem. We evaluate our method by optimizing locomotion trajectories of a quadruped robot on various granular terrains offline, and show that we can obtain long-horizon walking gaits of high qualities.

Keywords

RobotComputer scienceQuadratic programmingTrajectoryOptimization problemTrajectory optimizationMathematical optimizationQuadratic equationConvex optimizationBilevel optimization

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