International audienceA Triangular Spectral Element Method (TSEM) is presented to simulate elastic wave propagation using an unstructured triangulation of the physical domain. TSEM makes use of a variational formulation of elastodynamics based on unstructured straight-sided triangles that allow enhanced flexibility when dealing with complex geometries and velocity structures. The displacement field is expanded into a high-order polynomial spectral approximation over each triangular subdomain. Continuity between the subdomains of the triangulation is enforced using a multidimensional Lagrangian interpolation built on a set of Fekete points of the triangle. High-order accuracy is achieved by resorting to an analytical computation of the assoc...
We present a finite-volume method for the modeling of wave propagation on irregular triangular grid...
International audienceA new numerical technique for solving the 2D elastodynamic equations based on ...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...
International audienceA Triangular Spectral Element Method (TSEM) is presented to simulate elastic w...
We apply a spectral element method based upon a conforming mesh of quadrangles and triangles to the ...
We study the numerical dispersion/dissipation of Triangle-based Spectral Element Methods (T SEM) of...
Abstract We present the spectral element method to simulate lastic-wave prop-agation in realistic ge...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
We present a finite-volume method for the modeling of wave propagation on irregular triangular grids...
We present a hybrid spectral element/finite element domain decomposition method for solving elastic ...
The Spectral-Element Method (SEM) is a finite-element method that solves the wave equa-tion in the t...
Highly efficient algorithms are needed for full wave modelling in large-scale realistic un-bounded m...
谱元法(SEM)是基于有限元(FEM)的一种算法,在地震正演模拟中应用广泛,但是大部分研究都是基于四边形网格下的谱元法.本文给出了2阶谱元法在三角网格中(TSEM)的基本原理,包括Lagrange形函...
This paper serves as our first effort to develop a new triangular spectral element method (TSEM) on ...
Finite elements with mass lumping allow for explicit time stepping when modelling wave propagation a...
We present a finite-volume method for the modeling of wave propagation on irregular triangular grid...
International audienceA new numerical technique for solving the 2D elastodynamic equations based on ...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...
International audienceA Triangular Spectral Element Method (TSEM) is presented to simulate elastic w...
We apply a spectral element method based upon a conforming mesh of quadrangles and triangles to the ...
We study the numerical dispersion/dissipation of Triangle-based Spectral Element Methods (T SEM) of...
Abstract We present the spectral element method to simulate lastic-wave prop-agation in realistic ge...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
We present a finite-volume method for the modeling of wave propagation on irregular triangular grids...
We present a hybrid spectral element/finite element domain decomposition method for solving elastic ...
The Spectral-Element Method (SEM) is a finite-element method that solves the wave equa-tion in the t...
Highly efficient algorithms are needed for full wave modelling in large-scale realistic un-bounded m...
谱元法(SEM)是基于有限元(FEM)的一种算法,在地震正演模拟中应用广泛,但是大部分研究都是基于四边形网格下的谱元法.本文给出了2阶谱元法在三角网格中(TSEM)的基本原理,包括Lagrange形函...
This paper serves as our first effort to develop a new triangular spectral element method (TSEM) on ...
Finite elements with mass lumping allow for explicit time stepping when modelling wave propagation a...
We present a finite-volume method for the modeling of wave propagation on irregular triangular grid...
International audienceA new numerical technique for solving the 2D elastodynamic equations based on ...
A wavelet-based spectral finite element method (WSFEM) is presented that may be used for an accurate...