Data-Driven Geometric System Identification for Shape-Underactuated Dissipative Systems

TL;DR

This paper introduces a geometric system identification approach for Shape-Underactuated Dissipative Systems (SUDS), enabling efficient modeling and control of highly dissipative, partially actuated systems like soft robots and biological organisms.

Contribution

The paper extends geometric mechanics tools to SUDS, demonstrating linear model complexity scaling and improved sample efficiency for system identification and control.

Findings

Validated model predictions on simulated viscous swimmers

Showed linear scaling of model complexity with passive shape coordinates

Demonstrated potential for control and optimization in robotics

Abstract

Systems whose movement is highly dissipative provide an opportunity to both identify models easily and quickly optimize motions. Geometric mechanics provides means for reduction of the dynamics by environmental homogeneity, while the dissipative nature minimizes the role of second order (inertial) features in the dynamics. Here we extend the tools of geometric system identification to ``Shape-Underactuated Dissipative Systems (SUDS)'' -- systems whose motions are more dissipative than inertial, but whose actuation is restricted to a subset of the body shape coordinates. Many animal motions are SUDS, including micro-swimmers such as nematodes and flagellated bacteria, and granular locomotors such as snakes and lizards. Many soft robots are also SUDS, particularly those robots using highly damped series elastic actuators. Whether involved in locomotion or manipulation, these robots are often used to interface less rigidly with the environment. We motivate the use of SUDS models, and validate their ability to predict motion of a variety of simulated viscous swimming platforms. For a large class of SUDS, we show how the shape velocity actuation inputs can be directly converted into torque inputs suggesting that systems with soft pneumatic actuators or dielectric elastomers can be modeled with the tools presented. Based on fundamental assumptions in the physics, we show how our model complexity scales linearly with the number of passive shape coordinates. This offers a large reduction on the number of trials needed to identify the system model from experimental data, and may reduce overfitting. The sample efficiency of our method suggests its use in modeling, control, and optimization in robotics, and as a tool for the study of organismal motion in friction dominated regimes.