Version 1
: Received: 1 May 2023 / Approved: 2 May 2023 / Online: 2 May 2023 (05:14:15 CEST)
How to cite:
Tulus, T.; Rahman, M. M.; Sutarman, S.; Syahputra, M. R.; Marpaung, T. J.; Marpaung, J. L. Computational Analysis of Stability of Wave Propagation Against Submerged Permeable Breakwater Using Hybrid Finite Element Method. Preprints2023, 2023050059. https://doi.org/10.20944/preprints202305.0059.v1
Tulus, T.; Rahman, M. M.; Sutarman, S.; Syahputra, M. R.; Marpaung, T. J.; Marpaung, J. L. Computational Analysis of Stability of Wave Propagation Against Submerged Permeable Breakwater Using Hybrid Finite Element Method. Preprints 2023, 2023050059. https://doi.org/10.20944/preprints202305.0059.v1
Tulus, T.; Rahman, M. M.; Sutarman, S.; Syahputra, M. R.; Marpaung, T. J.; Marpaung, J. L. Computational Analysis of Stability of Wave Propagation Against Submerged Permeable Breakwater Using Hybrid Finite Element Method. Preprints2023, 2023050059. https://doi.org/10.20944/preprints202305.0059.v1
APA Style
Tulus, T., Rahman, M. M., Sutarman, S., Syahputra, M. R., Marpaung, T. J., & Marpaung, J. L. (2023). Computational Analysis of Stability of Wave Propagation Against Submerged Permeable Breakwater Using Hybrid Finite Element Method. Preprints. https://doi.org/10.20944/preprints202305.0059.v1
Chicago/Turabian Style
Tulus, T., Tulus Joseph Marpaung and Jonathan Liviera Marpaung. 2023 "Computational Analysis of Stability of Wave Propagation Against Submerged Permeable Breakwater Using Hybrid Finite Element Method" Preprints. https://doi.org/10.20944/preprints202305.0059.v1
Abstract
A wave is an energy that can propagate with a medium, the propagation of a wave moves with respect to time by carrying energy that moves with velocity per unit of time. Sea waves are one of the propagating wave problems that are broken down to produce wave propagation with a relatively inhomogeneous minimum amplitude and speed of sea waves which have their own difficulties in solving them numerically. This study aims to analyze the stability of wave propagation of submerged breakwaters using the Boundary Element Method. This research will approximate the boundary discretization of the breakwater domain and then combine it with the Finite Element Method in determining the moving elements of the velocity of fluid flow through a porous submerged breakwater. This study varies the magnitude of the incoming propagation velocity and the influence of the breakwater distance. The results of this study indicate that the resulting minimal wave assuming v = 1 m/s and the breakwater distance of s = 20 m gives a wave reflection with a minimum wave speed and amplitude of 0.12515 m
Computer Science and Mathematics, Computational Mathematics
Copyright:
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