Journal ArticleDOI
Finite-Element Model for Modified Boussinesq Equations. I: Model Development
Seung-Buhm Woo,Philip L.-F. Liu +1 more
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In this article, a Galerkin finite-element method with linear elements is employed in the model and auxiliary variables are introduced to remove the spatial third derivative terms in the governing equations, and an implicit predictorcorrector iterative scheme is used in the time integration.Abstract:
This paper and its companion paper describe the development of a finite-element model based on modified Boussinesq equations and the applications of the model to harbor resonance problems. This first of the two papers reports the model development and validations. A Galerkin finite-element method with linear elements is employed in the model. Auxiliary variables are introduced to remove the spatial third derivative terms in the governing equations, and an implicit predictor-corrector iterative scheme is used in the time integration. The treatments of various boundary conditions, including the perfect reflecting boundary with an irregular geometry, the absorbing (sponge layer) boundary, and the incident wave boundary, are described. Numerical results are obtained for several examples, and their accuracy is checked by comparing numerical results with either experimental data or analytical solutions.read more
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Automated Solution of Differential Equations by the Finite Element Method: The FEniCS Book
TL;DR: This book is a tutorial written by researchers and developers behind the FEniCS Project and explores an advanced, expressive approach to the development of mathematical software.
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Stability analysis of solitary wave solutions for the fourth-order nonlinear Boussinesq water wave equation
TL;DR: By using the extended auxiliary equation method, some new soliton like solutions for the two-dimensional fourth-order nonlinear Boussinesq equation with constant coefficient are obtained.
Journal ArticleDOI
Spectral/hp discontinuous Galerkin methods for modelling 2D Boussinesq equations
TL;DR: This work presents spectral/hp discontinuous Galerkin methods for modelling weakly nonlinear and dispersive water waves, described by a set of depth-integrated Boussinesq equations, on unstructured triangular meshes, and demonstrates that the approaches are fully equivalent.
Journal ArticleDOI
Numerical modeling of nonlinear resonance of semi-enclosed water bodies: Description and experimental validation
TL;DR: A numerical model to solve a set of modified Boussinesq equations to analyse nonlinear resonance of semi-enclosed water bodies to achieve an optimal mesh resolution with the local geometry is presented.
Journal ArticleDOI
Finite element approximation of the hyperbolic wave equation in mixed form
TL;DR: In this paper, the authors present a finite element approximation of the scalar hyperbolic wave equation written in mixed form, that is, introducing an auxiliary vector field to transform the problem into a first-order problem in space and time.
References
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Journal ArticleDOI
Long waves on a beach
TL;DR: In this paper, the Boussinesq equations for long waves in water of varying depth are derived for small amplitude waves, but do include non-linear terms, and solutions have been calculated numerically for a solitary wave on a beach of uniform slope, which is also derived analytically by using the linearized long-wave equations.
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Alternative form of Boussinesq equations for nearshore wave propagation
TL;DR: In this paper, a new form of the Boussinesq equations is derived using the velocity at an arbitrary distance from the still water level as the velocity variable instead of the commonly used depth-averaged velocity.
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A fully nonlinear Boussinesq model for surface waves. Part 1. Highly nonlinear unsteady waves
TL;DR: In this paper, a high-order numerical model based on the Boussinesq model was developed and applied to the study of two canonical problems: solitary wave shoaling on slopes and undular bore propagation over a horizontal bed.
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A new form of the Boussinesq equations with improved linear dispersion characteristics. Part 2. A slowly-varying bathymetry
Per A. Madsen,Ole R. Sørensen +1 more
TL;DR: In this paper, a new form of the Boussinesq equations applicable to irregular wave propagation on a slowly varying bathymetry from deep to shallow water is introduced, which incorporate excellent linear dispersion characteristics, and are formulated and solved in two horizontal dimensions.
Journal ArticleDOI
Time-Dependent Numerical Code for Extended Boussinesq Equations
Ge Wei,James T. Kirby +1 more
TL;DR: In this paper, a numerical code based on Nwogu's equations is developed, which uses a fourth-order predictor-corrector method to advance in time, and discretizes first-order spatial derivatives to fourthorder accuracy, thus reducing all truncation errors to a level smaller than the dispersive terms.