Title :
Motion planning and partial stabilization of infinite-dimensional systems
Author :
Zuyev, Alexander L.
Author_Institution :
Inst. of Appl. Math. & Mech., Donetsk, Ukraine
Abstract :
The paper deals with issues of mathematical modeling of hybrid mechanical systems consisting of rigid and deformable bodies. Under some assumptions the motion of such objects can be described by a system of ordinary differential equations evolving in a Banach space. A sufficient condition for partial asymptotic stability of autonomous nonlinear systems in Banach spaces is obtained. With the help of this result a technique for hybrid controller design is proposed. The above outcomes are applied for solving the stabilization problem of a rigid body with flexible elements. In conclusion, the results of numerical simulation are given
Keywords :
Banach spaces; asymptotic stability; differential equations; manipulators; multidimensional systems; nonlinear systems; path planning; Banach space; asymptotic stability; autonomous nonlinear systems; differential equations; feedback; hybrid mechanical systems; infinite-dimensional system; motion planning; stabilization; Asymptotic stability; Differential equations; Mathematical model; Mathematics; Mechanical systems; Nonlinear equations; Nonlinear systems; Numerical simulation; Robot control; Sufficient conditions;
Conference_Titel :
Robot Motion and Control, 2001 Proceedings of the Second International Workshop on
Conference_Location :
Bukowy Dworek
Print_ISBN :
83-7143-515-0
DOI :
10.1109/ROMOCO.2001.973443
