Stabilisation of the complex double integrator by means of a saturated linear feedback

Abstract

Consider the saturated complex double integrator, i.e., the linear control system x=Ax+Bσ(u), where x∈4, u∈, B∈4, the 4× 4 matrix A is not diagolizable and admits a non zero purely imaginary eigenvalue of multiplicity two, the pair (A,B) is controllable and σ: is a saturation function. We prove that there exists a linear feedback u=KTx such that the resulting closed loop system given by x=Ax+Bσ(KTx) is globally asymptotically stable with respect to the origin.