Frequency criteria in the absolute output stabilization problem for infinite dimensional systems

Author

Brusin, V.A.

Author_Institution

Nizhny Novgorod State Archit. & Building Acad., Nizhny Novgorod, Russia

fYear

1997

fDate

1-7 July 1997

Firstpage

87

Lastpage

92

Abstract

The paper deals with the output stabilization problem for nonlinear feedback systems with unmodelled functional block. The processes of the unmodelled block are assumed to be unmeasurable in general case. The infinite dimensional system case is considered. The problem solution is related to the generalized H^∞-control problem, for which the solution existence criteria are established. These criteria are obtained via the solution existence conditions of the generalized minimax optimization problem, related to above H^∞-problem. The class of controllers solving above problems is presented. The stabilization theorems are established. The application to MIMO-systems, described by the integral equations has been considered.

Keywords

H^∞ control; MIMO systems; feedback; integral equations; minimax techniques; multidimensional systems; nonlinear control systems; stability criteria; MIMO-systems; generalized H^∞-control problem; generalized minimax optimization problem; infinite dimensional systems; integral equations; nonlinear feedback systems; output stabilization problem; stabilization theorems; unmodelled block; Coercive force; Frequency control; Hilbert space; Integral equations; Mathematical model; Optimization; Stability criteria; Feedback stabilization; H∞/L1; Infinite dimensional systems;

fLanguage

English

Publisher

ieee

Conference_Titel

Control Conference (ECC), 1997 European

Conference_Location

Brussels

Print_ISBN

978-3-9524269-0-6

Type

conf

Filename

7082073