Litcius/Paper detail

Feedback Stabilization of a Class of Diagonal Infinite-Dimensional Systems With Delay Boundary Control

Hugo Lhachemi, Christophe Prieur

2021Arrow@dit (Dublin Institute of Technology)48 citations

Abstract

This article studies the boundary feedback stabilization of a class of diagonal infinite-dimensional boundary control systems. In the studied setting, the boundary control input is subject to a constant delay while the open-loop system might exhibit a finite number of unstable modes. The proposed control design strategy consists of two main steps. First, a finite-dimensional subsystem is obtained by truncation of the original infinitedimensional system (IDS) via modal decomposition. It includes the unstable components of the IDS and allows the design of a finite-dimensional delay controller by means of the Artstein transformation and the pole-shifting theorem. Second, it is shown via the selection of an adequate Lyapunov function that: 1) the finite-dimensional delay controller successfully stabilizes the original IDS and 2) the closed-loop system is exponentially input-to-state stable (ISS) with respect to distributed disturbances. Finally, the obtained ISS property is used to derive a small gain condition ensuring the stability of an IDS-ODE interconnection.

Topics & Concepts

Control theory (sociology)Boundary (topology)MathematicsDiagonalDistributed parameter systemExponential stabilityController (irrigation)Lyapunov functionMathematical analysisComputer scienceDifferential equationControl (management)Nonlinear systemPhysicsGeometryArtificial intelligenceAgronomyBiologyQuantum mechanicsStability and Controllability of Differential EquationsControl and Stability of Dynamical SystemsAdvanced Mathematical Modeling in Engineering