Finite-element Discretization of Static Hamilton-Jacobi Equations based on a Local Variational Principle

Folkmar Bornemann; Christian Rasch

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Finite-element Discretization of Static Hamilton-Jacobi Equations based on a Local Variational Principle

机译：基于局部变分原理的静态Hamilton-Jacobi方程的有限元离散化

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摘要

We propose a linear finite-element discretization of Dirichlet problems for static Hamilton–Jacobi equations on unstructured triangulations. The discretization is based on simplified localized Dirichlet problems that are solved by a local variational principle. It generalizes several approaches known in the literature and allows for a simple and transparent convergence theory. In this paper the resulting system of nonlinear equations is solved by an adaptive Gauss–Seidel iteration that is easily implemented and quite effective as a couple of numerical experiments show.

机译：对于非结构化三角剖分上的静态Hamilton-Jacobi方程，我们提出Dirichlet问题的线性有限元离散化。离散化基于通过局部变分原理解决的简化局部Dirichlet问题。它概括了文献中已知的几种方法，并允许使用简单透明的收敛理论。在本文中，非线性方程组通过自适应的Gauss-Seidel迭代求解，该迭代很容易实现且非常有效，如一些数值实验所示。

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来源
《Computing and visualization in science》 |2006年第2期|p. 57-69|共13页
作者
Folkmar Bornemann; Christian Rasch;
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作者单位

Center of Mathematics, M3, Technical University of Munich, 80290 Munich, Germany;

Center of Mathematics, M3, Technical University of Munich, 80290 Munich, Germany;

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原文格式 PDF
正文语种 eng
中图分类自动化技术、计算机技术;
关键词
Hamilton–Jacobi equation; Linear finite elements; Local variational principle; Viscosity solutions; Compatibility condition; Hopf–Lax formula; Eikonal equation; Adaptive Gauss–Seidel iteration;

机译：Hamilton–Jacobi方程;线性有限元;局部变分原理;粘度解;相容条件;Hopf–Lax公式;Eikonal方程;自适应Gauss–Seidel迭代;

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机译：Minkowski型问题，离散最优运输和离散MONGE方程的变分原理
2. Local-Structure-Preserving Discontinuous Galerkin Methods with Lax-Wendroff Type Time Discretizations for Hamilton-Jacobi Equations [J] . Wei Guo, Fengyan Li, Jianxian Qiu Journal of Scientific Computing . 2011,第2期

机译：Hamilton-Jacobi方程的Lax-Wendroff型时间离散化的保留局部结构的不连续Galerkin方法
3. Legendre-transform-based fast sweeping methods for static Hamilton-Jacobi equations on triangulated meshes [J] . Kao CY, Osher S, Qian JL Journal of Computational Physics . 2008,第24期

机译：基于Legendre变换的三角网格上静态Hamilton-Jacobi方程的快速扫描方法
4. Solving nonlinear Maxwell's equations with finite-element time-domain method and parametric variational principle [C] . Zhu Bao, Chen Jiefu 2014 31st URSI General Assembly and Scientific Symposium . 2014

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5. Numerical methods for static Hamilton-Jacobi equations. [D] . Luo, Songting. 2009

机译：静态Hamilton-Jacobi方程的数值方法。
6. Hyperviscosity-Based Stabilization for Radial Basis Function-Finite Difference (RBF-FD) Discretizations of Advection-Diffusion Equations [O] . Varun Shankar, Aaron L. Fogelson -1

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7. Finite-element discretization of static Hamilton-Jacobi equations based on a local variational principle [O] . Folkmar Bornemann, Christian Rasch 2005

机译：基于局部变分原理的静态Hamilton-Jacobi方程的有限元离散化
8. ATMOSPHERIC FIELD EQUATIONS BASED ON A VARIATIONAL PRINCIPLE WITH APPLICATION TO THE MOTION OF CLOSED SYSTEMS [R] . Yoshikazu Sasaki 1958

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Finite-element Discretization of Static Hamilton-Jacobi Equations based on a Local Variational Principle

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