English

Time Optimal Synthesis for Left--Invariant Control Systems on SO(3)

Optimization and Control 2007-05-23 v1

Abstract

Consider the control system given by x˙=x(f+ug)\dot x=x(f+ug), where xSO(3)x\in SO(3), u1|u|\leq 1 and f,gso(3)f,g\in so(3) define two perpendicular left-invariant vector fields normalized so that f=cos(\al)\|f\|=\cos(\al) and g=sin(\al)\|g\|=\sin(\al), \al]0,π/4[\al\in ]0,\pi/4[. In this paper, we provide an upper bound and a lower bound for N(α)N(\alpha), the maximum number of switchings for time-optimal trajectories. More precisely, we show that NS(\al)N(\al)NS(\al)+4N_S(\al)\leq N(\al)\leq N_S(\al)+4, where NS(\al)N_S(\al) is a suitable integer function of \al\al which for \al0\al\to 0 is of order π/(4α).\pi/(4\alpha). The result is obtained by studying the time optimal synthesis of a projected control problem on RP2R P^2, where the projection is defined by an appropriate Hopf fibration. Finally, we study the projected control problem on the unit sphere S2S^2. It exhibits interesting features which will be partly rigorously derived and partially described by numerical simulations.

Keywords

Cite

@article{arxiv.math/0502483,
  title  = {Time Optimal Synthesis for Left--Invariant Control Systems on SO(3)},
  author = {Ugo Boscain and Yacine Chitour},
  journal= {arXiv preprint arXiv:math/0502483},
  year   = {2007}
}