Topic
Finite difference
About: Finite difference is a research topic. Over the lifetime, 19693 publications have been published within this topic receiving 408603 citations.
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TL;DR: In this article, the minimum truncation error of one and two-dimensional Burgers' equations with moderate to severe internal and boundary gradients was compared with three, five-, and seven-point finite difference schemes with linear, quadratic, and cubic rectangular finite element schemes.
103 citations
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TL;DR: In this article, a Fourier series analysis is performed to determine the dissipative and dispersive characteristics of finite difference and finite element methods for solving the convective-dispersive equation.
Abstract: Various finite difference and finite element methods for solving the one-dimensional convective-dispersive equation are investigated. A Fourier series analysis is performed to determine the dissipative and dispersive characteristics of these numerical methods. The analysis indicates that the commonly observed phenomenon of overshoot of a concentration pulse is due to the inability of the numerical schemes to propagate the small wavelengths which are important to the description of the front. Furthermore, the numerical smearing of a sharp front is due to dissipation of these small wavelengths. The finite element method was found to be superior to finite difference methods for solution of the convective-dispersive equation.
103 citations
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TL;DR: In this paper, the results of numerical calculations are presented for the motion of a bore over a uniformly sloping beach, where the shallow water equations are solved in finite difference form, and a technique is developed for fitting in the bore at each step.
Abstract: The results of numerical calculations are presented for the motion of a bore over a uniformly sloping beach. The shallow water equations are solved in finite difference form, and a technique is developed for fitting in the bore at each step. The results are compared with the approximate formula given by Whitham (1958) and close agreement is found. The approximate theory is considered further here; the main addition is a rigorous proof that, within the shallow water theory, the height of the bore always tends to zero at the shoreline.
103 citations
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TL;DR: A model of transverse piano string vibration, second order in time, which models frequency-dependent loss and dispersion effects is presented here, and the waveguide model is extended to the case of several coupled strings.
Abstract: A model of transverse piano string vibration, second order in time, which models frequency-dependent loss and dispersion effects is presented here. This model has many desirable properties, in particular that it can be written as a well-posed initial-boundary value problem (permitting stable finite difference schemes) and that it may be directly related to a digital waveguide model, a digital filter-based algorithm which can be used for musical sound synthesis. Techniques for the extraction of model parameters from experimental data over the full range of the grand piano are discussed, as is the link between the model parameters and the filter responses in a digital waveguide. Simulations are performed. Finally, the waveguide model is extended to the case of several coupled strings.
103 citations
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TL;DR: In this article, the authors investigated the discretization errors and order of accuracy of the velocity and pressure solution obtained from the finite difference-marker-in-cell (FD-MIC) method using two-dimensional analytic solutions.
Abstract: The finite difference–marker-in-cell (FD-MIC) method is a popular method in thermomechanical modeling in geodynamics. Although no systematic study has investigated the numerical properties of the method, numerous applications have shown its robustness and flexibility for the study of large viscous deformations. The model setups used in geodynamics often involve large smooth variations of viscosity (e.g., temperature-dependent viscosity) as well large discontinuous variations in material properties (e.g., material interfaces). Establishing the numerical properties of the FD-MIC and showing that the scheme is convergent adds relevance to the applications studies that employ this method. In this study, we numerically investigate the discretization errors and order of accuracy of the velocity and pressure solution obtained from the FD-MIC scheme using two-dimensional analytic solutions. We show that, depending on which type of boundary condition is used, the FD-MIC scheme is a second-order accurate in space as long as the viscosity field is constant or smooth (i.e., continuous). With the introduction of a discontinuous viscosity field characterized by a viscosity jump (η*) within the control volume, the scheme becomes first-order accurate. We observed that the transition from second-order to first-order accuracy will occur with only a small increase in the viscosity contrast (η* ≈ 5). We have employed two methods for projecting the material properties from the Lagrangian markers onto the Eulerian nodes. The methods are based on the size of the interpolation volume (4-cell, 1-cell). The use of a more local interpolation scheme (1-cell) decreases the absolute velocity and pressure discretization errors. We also introduce a stabilization algorithm that damps the potential oscillations that may arise from quasi free surface calculations in numerical codes that employ the strong form of the Stokes equations. This correction term is of particular interest for topographic modeling, since the surface of the Earth is generally represented by a free surface. Including the stabilization enables physically meaningful solutions to be obtained from our simulations, even in cases where the time step value exceeds the isostatic relaxation time. We show that including the stabilization algorithm in our FD stencil does not affect the convergence properties of our scheme. In order to verify our approach, we performed time-dependent simulations of free surface Rayleigh-Taylor instability.
102 citations