Title :
Spillover, nonlinearity and flexible structures
Author :
Bass, Robert W. ; Zes, Dean
Author_Institution :
Rockwell Int. Sci. Center, Thousand Oaks, CA, USA
Abstract :
It is suggested that a partial differential equation should not be linearized until after its reduction to a finite-dimensional ordinary differential equation. This idea can be implemented by means of an analytical procedure involving the Lyapunov-Schmidt bifurcation equations. A rigorous reduction of a singular infinite-dimensional implicit equation to the problem of an equivalent, merely finite-dimensional implicit equation is carried out. As an illustration, the auxiliary equation and bifurcation equations for the problem of deflection of an intension extensible beam is considered, including viscous damping and Balakrishnan-Taylor damping
Keywords :
Lyapunov methods; control nonlinearities; damping; multidimensional systems; partial differential equations; Balakrishnan-Taylor damping; Lyapunov-Schmidt bifurcation equations; deflection; flexible structures; intension extensible beam; nonlinearity; partial differential equation; viscous damping; Actuators; Bifurcation; Control systems; Damping; Differential equations; Flexible structures; Functional analysis; Hilbert space; Motion control; Nonlinear equations; Partial differential equations;
Conference_Titel :
Decision and Control, 1991., Proceedings of the 30th IEEE Conference on
Conference_Location :
Brighton
Print_ISBN :
0-7803-0450-0
DOI :
10.1109/CDC.1991.261683
