Modeling a Wave on Mild Sloping Bottom Topography and Its Dispersion Relation Approximation

Faizal Ade Rahmahuddin Abdullah; Elvi Syukrina Erianto

doi:10.15575/kubik.v7i1.18419

Modeling a Wave on Mild Sloping Bottom Topography and Its Dispersion Relation Approximation

Faizal Ade Rahmahuddin Abdullah^(1*), Elvi Syukrina Erianto⁽²⁾

(1) ID Scoupus: 57211667630; Marine Disaster Research Center, Korea Institute of Ocean Science and Technology (KIOST), Korea, Republic of
(2) UIN Sunan Gunung Djati Bandung, Indonesia
(*) Corresponding Author

Abstract

Linear wave theory is a simple theory that researchers and engineers often use to study a wave in deep, intermediate, and shallow water regions. Many researchers mostly used it over the horizontal flat seabed, but in actual conditions, sloping seabed always exists, although mild. In this research, we try to model a wave over a mild sloping seabed by linear wave theory and analyze the influence of the seabed’s slope on the solution of the model. The model is constructed from Laplace and Bernoulli equations together with kinematic and dynamic boundary conditions. We used the result of the analytical solution to find the relation between propagation speed, wavelength, and bed slope through the dispersion relation. Because of the difference in fluid dispersive character for each water region, we also determined dispersion relation approximation by modifying the hyperbolic tangent form into hyperbolic sine-cosine and exponential form, then approximated it with Padé approximant. As the final result, exponential form modification with Padé approximant had the best agreement to exact dispersion relation equation then direct hyperbolic tangent form.

Keywords

linear wave, mild sloping seabed, dispersion relation approximation, velocity potential

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DOI: https://doi.org/10.15575/kubik.v7i1.18419

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Modeling a Wave on Mild Sloping Bottom Topography and Its Dispersion Relation Approximation

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