Stabilization of linear waves with inhomogeneous Neumann boundary conditions
We study linear damped and viscoelastic wave equations evolving on a bounded domain. For both models, we assume that waves are subject to an inhomogeneous Neumann boundary condition on a portion of the domain's boundary. The analysis of these models presents additional interesting features and...
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| Main Authors | , |
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| Format | Journal Article |
| Language | English |
| Published |
13.10.2024
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| Subjects | |
| Online Access | Get full text |
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| Summary: | We study linear damped and viscoelastic wave equations evolving on a bounded
domain. For both models, we assume that waves are subject to an inhomogeneous
Neumann boundary condition on a portion of the domain's boundary. The analysis
of these models presents additional interesting features and challenges
compared to their homogeneous counterparts. In the present context, energy
depends on the boundary trace of velocity. It is not clear in advance how this
quantity should be controlled based on the given data, due to regularity
issues. However, we establish global existence and also prove uniform
stabilization of solutions with decay rates characterized by the Neumann input.
We supplement these results with numerical simulations in which the data do not
necessarily satisfy the given assumptions for decay. These simulations provide,
at a numerical level, insights into how energy could possibly change in the
presence of, for example, improper data. |
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| DOI: | 10.48550/arxiv.2410.09994 |