TY - JOUR
T1 - Local observability of invariant dynamics on compact Lie groups with square integrable output map functions
AU - Ayala, V.
AU - Hacibekiroglu, A. K.
PY - 1997/12
Y1 - 1997/12
N2 - In this work, we give a sufficient algebraic condition for the local observability problem of invariant control systems on compact Lie groups such that the output map is not differentiable. In particular, the usual techniques involving Lie derivatives do not work. Our approach comes from the representation theory. We use the regular representation to construct a bilinear system on the Hubert space of the square integrable function defined on the group to a finite-dimensional vector space. If this bilinear system is observable, then we prove that the invariant control system is locally observable.
AB - In this work, we give a sufficient algebraic condition for the local observability problem of invariant control systems on compact Lie groups such that the output map is not differentiable. In particular, the usual techniques involving Lie derivatives do not work. Our approach comes from the representation theory. We use the regular representation to construct a bilinear system on the Hubert space of the square integrable function defined on the group to a finite-dimensional vector space. If this bilinear system is observable, then we prove that the invariant control system is locally observable.
KW - Invariance
KW - L-output map
KW - Local observability
KW - Nondifferentiable output map
KW - Representation theory
UR - https://www.scopus.com/pages/publications/0031340740
U2 - 10.1016/S0898-1221(97)00234-4
DO - 10.1016/S0898-1221(97)00234-4
M3 - Article
AN - SCOPUS:0031340740
SN - 0898-1221
VL - 34
SP - 61
EP - 70
JO - Computers and Mathematics with Applications
JF - Computers and Mathematics with Applications
IS - 12
ER -