TY - JOUR
T1 - Spectral Analysis of a Class of Linear Hyperbolic Partial Differential Equations
AU - Hastir, Anthony
AU - Jacob, Birgit
AU - Zwart, Hans
N1 - Publisher Copyright:
© 2017 IEEE.
PY - 2024/5/20
Y1 - 2024/5/20
N2 - A class of linear hyperbolic partial differential equations, sometimes called networks of waves, is considered. For this class of systems, necessary and sufficient conditions are formulated on the system matrices for the operator dynamics to be a Riesz-spectral operator. In that case, its spectrum is computed explicitly, together with the corresponding eigenfunctions, which constitutes the main result of our letter. In particular, this enables to characterize easily many different concepts, such as stability. We apply our results to characterize exponential stability of a co-current heat exchanger.
AB - A class of linear hyperbolic partial differential equations, sometimes called networks of waves, is considered. For this class of systems, necessary and sufficient conditions are formulated on the system matrices for the operator dynamics to be a Riesz-spectral operator. In that case, its spectrum is computed explicitly, together with the corresponding eigenfunctions, which constitutes the main result of our letter. In particular, this enables to characterize easily many different concepts, such as stability. We apply our results to characterize exponential stability of a co-current heat exchanger.
U2 - 10.1109/LCSYS.2024.3403472
DO - 10.1109/LCSYS.2024.3403472
M3 - Article
SN - 2475-1456
VL - 8
SP - 766
EP - 771
JO - Control Systems Letters (L-CSS)
JF - Control Systems Letters (L-CSS)
ER -