Please use this identifier to cite or link to this item: http://dspace.iitrpr.ac.in:8080/xmlui/handle/123456789/4280
Title: Algebraic method for approximate solution of scattering of surface waves by thin vertical barrier over a stepped bottom topography
Authors: Kumar, N.
Goyal, D.
Martha, S.C.
Keywords: Scattering of waves
Eigenfunction expansion
Least-squares method
Reflection and transmission coefficients
Force on the barrier over step
Issue Date: 9-Dec-2022
Abstract: A study on interaction of surface water waves by thin vertical rigid barrier over a step type bottom topography is analysed. The associated mixed boundary value problem is solved using the eigenfunction expansion of the velocity potential. The resulting system of equations, avoiding the traditional approach of employing application of orthogonality relations, is solved using algebraic least squares method giving rise the numerical values of the reflection and transmission coefficients by the barrier over step. The energy balance relation for the given problem is derived and verified numerically ensuring the correctness of the present results. The present results are also compared with the data available in the literature for the validation purpose. The effect of step height, length of the barrier and angle of incidence on the reflection coefficient and the non-dimensional horizontal force on the barrier have been investigated through different plots. It is observed that barrier along with step works as an effective barrier to reflect more incident waves causing calm zone along the leeside.
URI: http://localhost:8080/xmlui/handle/123456789/4280
Appears in Collections:Year-2022

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