Title of article
Finite-Dimensional Control of Parabolic PDE Systems Using Approximate Inertial Manifolds
Author/Authors
Panagiotis D. Christofides and Prodromos Daoutidis، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 1997
Pages
23
From page
398
To page
420
Abstract
This paper introduces a methodology for the synthesis of nonlinear finite-dimensional
output feedback controllers for systems of quasi-linear parabolic partial
differential equations PDEs., for which the eigenspectrum of the spatial differential
operator can be partitioned into a finite-dimensional slow one and an infinitedimensional
stable fast complement. Combination of Galerkin’s method with a
novel procedure for the construction of approximate inertial manifolds for the
PDE system is employed for the derivation of ordinary differential equation ODE.
systems whose dimension is equal to the number of slow modes.that yield
solutions which are close, up to a desired accuracy, to the ones of the PDE system,
for almost all times. These ODE systems are used as the basis for the synthesis of
nonlinear output feedback controllers that guarantee stability and enforce the
output of the closed-loop system to follow up to a desired accuracy, a prespecified
response for almost all times.
Journal title
Journal of Mathematical Analysis and Applications
Serial Year
1997
Journal title
Journal of Mathematical Analysis and Applications
Record number
929840
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