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Trapped modes along periodic structures submerged in a two-layer fluid with free surface and a background steady flow
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Resumo(s)
This study examines the trapping of linear water waves by an endless structure of stationary, three-dimensional periodic obstacles within a two-layer fluid system. The setup features a lower layer of either limited or unlimited depth, overlaid by an upper layer of finite thickness bounded by a free surface, with each layer exhibiting its own constant background speed relative to the fixed reference frame. For real roots to emerge in the dispersion relation, an additional stability condition on the layer velocities is necessary. By selecting adequate choices for the background flow, a non-linear eigenvalue problem is derived from the variational formulation; its reasonable approximation yields a geometric criterion that guarantees the presence of trapped modes (subject to the aforementioned stability bounds). The selection of the eigenvalue is influenced by velocity owing to the presence of an interface and free surface. Due to inherent symmetries, the overall analysis can be confined to the positive quadrant of the velocity domain. Illustrations are provided for various obstacle setups that produce trapped modes in diverse ways.
Descrição
Palavras-chave
Trapped modes Spectral problem Dispersion relation Steady flow
Contexto Educativo
Citação
Dias, G., & Pereira, B. (2025). Trapped modes along periodic structures submerged in a two-layer fluid with free surface and a background steady flow. Axioms, 14(11), 1-41. https://doi.org/10.3390/axioms14110846
Editora
MDPI