Almost Global Trajectory Tracking for Quadrotors Using Thrust Direction Control on $\mathcal{S}^2$

TL;DR

This paper introduces a novel quadrotor control method that ensures almost global stability by using a Lyapunov-based approach on the sphere, simplifying tuning and enhancing tracking performance.

Contribution

It develops a new control law leveraging Lyapunov functions on $\

Findings

Achieves almost global stability for quadrotor trajectory tracking.

Simplifies controller tuning and improves tracking performance.

Validated through simulations and real-world experiments.

Abstract

Many of the existing works on quadrotor control address the trajectory tracking problem by employing a cascade design in which the translational and rotational dynamics are stabilized by two separate controllers. The stability of the cascade is often proved by employing trajectory-based arguments, most notably, integral input-to-state stability. In this paper, we follow a different route and present a control law ensuring that a composite function constructed from the translational and rotational tracking errors is a Lyapunov function for the closed-loop cascade. In particular, starting from a generic control law for the double integrator, we develop a suitable attitude control extension, by leveraging a backstepping-like procedure. Using this construction, we provide an almost global stability certificate. The proposed design employs the unit sphere $\mathcal{S}^2$ to describe the rotational degrees of freedom required for position control. This enables a simpler controller tuning and an improved tracking performance with respect to previous global solutions. The new design is demonstrated via numerical simulations and on real-world experiments.