Lp-stabilization of integrator chains subject to input saturation using Lyapunov-based homogeneous design

Abstract

Consider the n-th integrator x=Jnx+σ(u)en, where x∈Rn, u∈ R, Jn is the n-th Jordan block and en=(0\ ·s 0\ 1)T∈Rn. We provide easily implementable state feedback laws u=k(x) which not only render the closed-loop system globally asymptotically stable but also are finite-gain Lp-stabilizing with arbitrarily small gain. These Lp-stabilizing state feedbacks are built from homogeneous feedbacks appearing in finite-time stabilization of linear systems. We also provide additional L∞-stabilization results for the case of both internal and external disturbances of the n-th integrator, namely for the perturbed system x=Jnx+enσ(k(x)+d)+D where d∈R and D∈Rn.