TY - JOUR
T1 - Finite-Dimensional Boundary Control of a Wave Equation with Viscous Friction and Boundary Measurements
AU - Selivanov, Anton
AU - Fridman, Emilia
N1 - Publisher Copyright:
© 1963-2012 IEEE.
PY - 2024/5/1
Y1 - 2024/5/1
N2 - Recently, a constructive approach to the design of finite-dimensional observer-based controller has been proposed for parabolic partial differential equations (PDEs). This article extends it to hyperbolic PDEs. Namely, we design a finite-dimensional, output-feedback, boundary controller for a wave equation with in-domain viscous friction. The control-free system is unstable for any friction coefficient due to an external force. Our approach is based on modal decomposition: an observer-based controller is designed for a finite-dimensional projection of the wave equation on N eigenfunctions (modes) of the Sturm-Liouville operator. The danger of this approach is the 'spillover' effect: such a controller may have a deteriorating effect on the stability of the unconsidered modes and cause instability of the full system. Our main contribution is an appropriate Lyapunov-based analysis leading to linear matrix inequalities (LMIs) that allow one to find a controller gain and number of modes, N, guaranteeing that the 'spillover' effect does not occur. An important merit of the derived LMIs is that their complexity does not change when N grows. Moreover, we show that appropriate N always exists and, if the LMIs are feasible for some N, they remain so for N+1.
AB - Recently, a constructive approach to the design of finite-dimensional observer-based controller has been proposed for parabolic partial differential equations (PDEs). This article extends it to hyperbolic PDEs. Namely, we design a finite-dimensional, output-feedback, boundary controller for a wave equation with in-domain viscous friction. The control-free system is unstable for any friction coefficient due to an external force. Our approach is based on modal decomposition: an observer-based controller is designed for a finite-dimensional projection of the wave equation on N eigenfunctions (modes) of the Sturm-Liouville operator. The danger of this approach is the 'spillover' effect: such a controller may have a deteriorating effect on the stability of the unconsidered modes and cause instability of the full system. Our main contribution is an appropriate Lyapunov-based analysis leading to linear matrix inequalities (LMIs) that allow one to find a controller gain and number of modes, N, guaranteeing that the 'spillover' effect does not occur. An important merit of the derived LMIs is that their complexity does not change when N grows. Moreover, we show that appropriate N always exists and, if the LMIs are feasible for some N, they remain so for N+1.
KW - Distributed parameter systems
KW - LMIs
KW - modal decomposition
KW - wave equation
UR - http://www.scopus.com/inward/record.url?scp=85173065975&partnerID=8YFLogxK
U2 - 10.1109/TAC.2023.3319443
DO - 10.1109/TAC.2023.3319443
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AN - SCOPUS:85173065975
SN - 0018-9286
VL - 69
SP - 3182
EP - 3189
JO - IEEE Transactions on Automatic Control
JF - IEEE Transactions on Automatic Control
IS - 5
ER -