English

Inverse-Dynamics MPC via Nullspace Resolution

Robotics 2023-03-24 v3 Computational Engineering, Finance, and Science Systems and Control Systems and Control

Abstract

Optimal control (OC) using inverse dynamics provides numerical benefits such as coarse optimization, cheaper computation of derivatives, and a high convergence rate. However, to take advantage of these benefits in model predictive control (MPC) for legged robots, it is crucial to handle efficiently its large number of equality constraints. To accomplish this, we first (i) propose a novel approach to handle equality constraints based on nullspace parametrization. Our approach balances optimality, and both dynamics and equality-constraint feasibility appropriately, which increases the basin of attraction to high-quality local minima. To do so, we (ii) modify our feasibility-driven search by incorporating a merit function. Furthermore, we introduce (iii) a condensed formulation of inverse dynamics that considers arbitrary actuator models. We also propose (iv) a novel MPC based on inverse dynamics within a perceptive locomotion framework. Finally, we present (v) a theoretical comparison of optimal control with forward and inverse dynamics and evaluate both numerically. Our approach enables the first application of inverse-dynamics MPC on hardware, resulting in state-of-the-art dynamic climbing on the ANYmal robot. We benchmark it over a wide range of robotics problems and generate agile and complex maneuvers. We show the computational reduction of our nullspace resolution and condensed formulation (up to 47.3%). We provide evidence of the benefits of our approach by solving coarse optimization problems with a high convergence rate (up to 10 Hz of discretization). Our algorithm is publicly available inside CROCODDYL.

Keywords

Cite

@article{arxiv.2209.05375,
  title  = {Inverse-Dynamics MPC via Nullspace Resolution},
  author = {Carlos Mastalli and Saroj Prasad Chhatoi and Thomas Corbères and Steve Tonneau and Sethu Vijayakumar},
  journal= {arXiv preprint arXiv:2209.05375},
  year   = {2023}
}

Comments

20 pages, 14 figures, accepted to IEEE TRO

R2 v1 2026-06-28T01:08:39.688Z