Stability Results for a Laminated Beam with Kelvin–Voigt Damping
Resumen
In this work, we consider a laminated beam subjected to Kelvin–Voigt damping. Under the semigroup theory approach, applying the Lumer–Phillips Theorem, we establish the well-posedness of the associated initial value problem. This paper aims to prove exponential and polynomial stability results when the system is fully and partially damped. First, using the method developed by Z. Liu and S. Zheng, we show that the semigroup associated with the fully damped system is analytic and, consequently, exponentially stable. On the other hand, we prove the lack of exponential stability when the system is partially damped, and then, using the Borichev and Tomilov Theorem, we prove its polynomial stability.
Cómo citar
Ramos, A. J. A., Freitas, M. M., Cabanillas Zannini, V. R., Dos Santos, M. J. & Raposo, C. A. (2023). Stability Results for a Laminated Beam with Kelvin–Voigt Damping. Bulletin of the Malaysian Mathematical Sciences Society, 46(5). https://doi.org/10.1007/s40840-023-01550-xEditor
SpringerCategoría / Subcategoría
PendienteTemas
Revista
Bulletin of the Malaysian Mathematical Sciences SocietyISSN
0126-6705Coleccion(es)
- Estudios Generales [122]