Litcius/Paper detail

Lie Algebraic Cost Function Design for Control on Lie Groups

Sangli Teng, William Clark, Anthony M. Bloch, Ram Vasudevan, Maani Ghaffari

20222022 IEEE 61st Conference on Decision and Control (CDC)26 citationsDOI

Abstract

This paper presents a control framework on Lie groups by designing the control objective in its Lie algebra. Control on Lie groups is challenging due to its nonlinear nature and difficulties in system parameterization. Existing methods to design the control objective on a Lie group and then derive the gradient for controller design are non-trivial and can result in slow convergence in tracking control. We show that with a proper left-invariant metric, setting the gradient of the cost function as the tracking error in the Lie algebra leads to a quadratic Lyapunov function that enables globally exponential convergence. In the PD control case, we show that our controller can maintain an exponential convergence rate even when the initial error is approaching π in SO(3). We also show the merit of this proposed framework in trajectory optimization. The proposed cost function enables the iterative Linear Quadratic Regulator (iLQR) to converge much faster than the Differential Dynamic Programming (DDP) with a well-adopted cost function when the initial trajectory is poorly initialized on SO(3).

Topics & Concepts

Lie groupMathematicsControl theory (sociology)Lyapunov functionLie algebraTracking errorOptimal controlMathematical optimizationComputer scienceNonlinear systemPure mathematicsControl (management)Artificial intelligenceQuantum mechanicsPhysicsAdaptive Control of Nonlinear SystemsAdvanced Control Systems OptimizationDistributed Control Multi-Agent Systems