Inertial manifold and state estimation of dissipative nonlinear PDE systems

DOI10.1080/00036811.2014.946659zbMath1304.35739OpenAlexW2050180230WikidataQ61891173 ScholiaQ61891173MaRDI QIDQ2933125

Publication date: 10 December 2014

Published in: Applicable Analysis (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1080/00036811.2014.946659

zbMATH Keywords

state estimation inertial manifold observer design dissipative PDE systems

Mathematics Subject Classification ID

Observability (93B07) Partial functional-differential equations (35R10) Operator partial differential equations (= PDEs on finite-dimensional spaces for abstract space valued functions) (35R20)

Cites Work

Linearization by output injection and nonlinear observers
Inertial manifolds for partial differential evolution equations under time-discretization: Existence, convergence, and applications
Approximate inertial manifolds for reaction-diffusion equations in high space dimension
Some infinite-dimensional Morse-Smale systems defined by parabolic partial differential equations
Inertial manifolds for nonlinear evolutionary equations
Nonlinear evolution equations - global behavior of solutions
Smoothness of inertial manifolds
Observers for linearly unobservable nonlinear systems
An observer for infinite-dimensional dissipative bilinear systems
Exact observability and exponential stability of infinite-dimensional bilinear systems
The global existence of nonlinear observers with linear error dynamics: a topological point of view
The Linear Regulator Problem for Parabolic Systems
Nonlinear Observers with Linearizable Error Dynamics
Structure of the set of stationary solutions of the navier‐stokes equations
An approximate inertial manifolds approach to postprocessing the Galerkin method for the Navier-Stokes equations
Nonlinear observers in reflexive Banach spaces
Optimal Feedback Control of Infinite-Dimensional Parabolic Evolution Systems: Approximation Techniques
Nonlinear Observer Design in the Siegel Domain
Nonlinear discrete-time observer design with linearizable error dynamics
Nonlinear observers for autonomous Lipschitz continuous systems
A Direct Method for the Construction of Nonlinear Discrete-Time Observer With Linearizable Error Dynamics

This page was built for publication: Inertial manifold and state estimation of dissipative nonlinear PDE systems