Exponential convergence to steady-states for trajectories of a damped dynamical system modeling adhesive strings
Coclite GM, De Nitti N, Maddalena F, Orlando G, Zuazua E (2024)
Publication Type: Journal article
Publication year: 2024
Journal
DOI: 10.1142/S021820252450026X
Abstract
We study the global well-posedness and asymptotic behavior for a semilinear damped wave equation with Neumann boundary conditions, modeling a one-dimensional linearly elastic body interacting with a rigid substrate through an adhesive material. The key feature of of the problem is that the interplay between the nonlinear force and the boundary conditions allows for a continuous set of equilibrium points. We prove an exponential rate of convergence for the solution towards a (uniquely determined) equilibrium point.
Authors with CRIS profile
Enrique Zuazua Iriondo
Lehrstuhl für Dynamics, Control, Machine Learning and Numerics (Alexander von Humboldt-Professur)
Involved external institutions
Italy (IT)
Switzerland (CH)How to cite
APA:
Coclite, G.M., De Nitti, N., Maddalena, F., Orlando, G., & Zuazua, E. (2024). Exponential convergence to steady-states for trajectories of a damped dynamical system modeling adhesive strings. Mathematical Models & Methods in Applied Sciences. https://doi.org/10.1142/S021820252450026X
MLA:
Coclite, Giuseppe Maria, et al. "Exponential convergence to steady-states for trajectories of a damped dynamical system modeling adhesive strings." Mathematical Models & Methods in Applied Sciences (2024).
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