Title :
On the stabilization of nonholonomic systems
Author_Institution :
Dept. of Autom. Control, Swiss Federal Inst. of Technol., Zurich, Switzerland
Abstract :
We discuss the issue of local (global) stabilizability of nonholonomic systems. We show that if a nonholonomic system with less inputs as states presents certain geometric features, mainly the existence of a controlled invariant distribution, and if it is non continuous, it is possible to design a locally (globally) stabilizing continuously differentiable (smooth) control law around a point of discontinuity. The main contribution of the paper rests on a sufficient condition for stabilizability of discontinuous nonholonomic systems and on the use of a non-smooth coordinate transformation to overcome the obstruction of stabilizability contained in Brockett´s theorem
Keywords :
control system analysis; discrete time systems; nonlinear systems; stability; state feedback; state-space methods; Brockett´s theorem; continuously differentiable control; feedback stabilization; invariant distribution; nonholonomic systems; state feedback; state space; sufficient condition; Automatic control; Bridges; Continuous time systems; Control systems; Laboratories; Nonlinear systems; Paper technology; State feedback; State-space methods; Sufficient conditions;
Conference_Titel :
Decision and Control, 1994., Proceedings of the 33rd IEEE Conference on
Conference_Location :
Lake Buena Vista, FL
Print_ISBN :
0-7803-1968-0
DOI :
10.1109/CDC.1994.411685
