@inproceedings{72dd2f1d0360416fb7767aded00fd6f7,
title = "Dynamic boundary stabilization of Euler-Bernoulli beam through a Kelvin-Voigt damped wave equation",
abstract = "In this paper, we study the stability of a one-dimentional Euler-Bernoulli beam coupled with a Kelvin-Voigt damped wave equation, where the wave equation acts as a dynamic boundary feedback controller to exponentially stabilize the Euler-Bernoulli beam. Remarkably, the resolvent of the closed-loop system operator is not compact anymore. By a detailed spectral analysis, we show that the residual spectrum is empty and the continuous spectrum contains only one point. Moreover, we verify that the generalized eigenfunctions of the system forms a Riesz basis for the energy state space. It then follows that the C0-semigroup generated by the system operator satisfies the spectrum-determined growth assumption. Finally, the exponential stability and Gevrey regularity of the system are established.",
keywords = "Euler-Bernoulli equation, Kelvin-Voigt damping, Riesz basis, asymptotic analysis, spectrum, stability",
author = "Lu Lu and Wang, {Jun Min}",
year = "2014",
doi = "10.1109/CCDC.2014.6852149",
language = "English",
isbn = "9781479937066",
series = "26th Chinese Control and Decision Conference, CCDC 2014",
publisher = "IEEE Computer Society",
pages = "223--228",
booktitle = "26th Chinese Control and Decision Conference, CCDC 2014",
address = "United States",
note = "26th Chinese Control and Decision Conference, CCDC 2014 ; Conference date: 31-05-2014 Through 02-06-2014",
}