NUMERICAL VISCOSITY AND CONVERGENCE OF FINITE VOLUME METHODS FOR CONSERVATION LAWS WITH BOUNDARY CONDITIONS

Benharbit S.; Vila JP.; Chalabi A.

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NUMERICAL VISCOSITY AND CONVERGENCE OF FINITE VOLUME METHODS FOR CONSERVATION LAWS WITH BOUNDARY CONDITIONS

机译：具有边界条件的守恒律的有限体积方法的数值粘性和收敛性

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The authors study the convergence of finite volume schemes for general multidimensional conservation laws with boundary conditions. A unique result for a measure-valued solution, which generalizes those of Diperna for unbounded domains and Szepessy for bounded domains, is proved. It gives us sufficient conditions to get convergence. By studying carefully the entropy production for one-dimensional E-schemes we are able to prove convergence of finite volume E-schemes under general assumption. [References: 24]

机译：作者研究了带有边界条件的一般多维守恒定律的有限体积方案的收敛性。证明了度量值解决方案的独特结果，该解决方案推广了Diperna用于无界域和Szepessy的有界域。它为我们提供了获得收敛的充分条件。通过仔细研究一维电子方案的熵产生，我们能够证明一般假设下有限体积电子方案的收敛性。 [参考：24]

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《SIAM Journal on Numerical Analysis》 |1995年第3期|共22页
作者
Benharbit S.; Vila JP.; Chalabi A.;
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正文语种 eng
中图分类应用数学;
关键词
Conservation laws; Measure-valued solution; Finite volume methods; Numerical viscosity; Boundary conditions; Nonlinear hyperbolic equation; Measure-valued solutions; Difference approximations; Entropy condition; Triangular mesh; Element method; Scheme;

机译：守恒律;量值解;有限体积法;数值黏度;边界条件;非线性双曲方程;量值解;差分近似;熵条件;三角网格;元法;方案;

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1. NUMERICAL VISCOSITY AND CONVERGENCE OF FINITE VOLUME METHODS FOR CONSERVATION LAWS WITH BOUNDARY CONDITIONS [J] . Benharbit S., Vila JP., Chalabi A. SIAM Journal on Numerical Analysis . 1995,第3期

机译：具有边界条件的守恒律的有限体积方法的数值粘性和收敛性
2. Convergence of a finite element method for scalar conservation laws with boundary conditions in two space dimensions [J] . Ji XM Journal of computational analysis and applications . 2005,第2期

机译：具有二维空间边界条件的标量守恒律的有限元方法的收敛性
3. L-1-convergence rate of viscosity methods for scalar conservation laws with the interaction of elementary waves and the boundary [J] . Liu HX, Pan T Quarterly of Applied Mathematics . 2004,第4期

机译：具有基本波和边界相互作用的标量守恒律的粘度方法的L-1收敛速度
4. Boundary stabilization of hyperbolic conservation laws using conservative finite volume schemes [C] . Michael Herty, Hui Yu IEEE Conference on Decision and Control . 2016

机译：使用保守有限体积方案的双曲守恒律的边界稳定
5. Numerical solutions of hyperbolic conservation laws: Incorporating multi-resolution viscosity methods into the finite element framework. [D] . Calhoun-Lopez, Marcus. 2003

机译：双曲守恒律的数值解：将多分辨率黏度方法纳入有限元框架。
6. Biaxial Tension of Fibrous Tissue: Using Finite Element Methods to Address Experimental Challenges Arising From Boundary Conditions and Anisotropy [O] . Nathan T. Jacobs, Daniel H. Cortes, Edward J. Vresilovic, -1

机译：纤维组织的双轴拉伸：使用有限元方法解决边界条件和各向异性带来的实验挑战
7. Convergence of a streamline diffusion finite element method for scalar conservation laws with boundary conditions [O] . A. Szepessy 1991

机译：具有边界条件的标量保护法的流线扩散有限元方法的融合
8. Convergence of High Order Finite Volume Weighted Essentially Non- Oscillatory Scheme and Discontinuous Galerkin Method for Nonconvex Conservation Laws [R] . Qiu, J. , Shu, C. 2007

机译：非凸保守定律的高阶有限体积加权本质非振动格式和间断Galerkin方法的收敛性

NUMERICAL VISCOSITY AND CONVERGENCE OF FINITE VOLUME METHODS FOR CONSERVATION LAWS WITH BOUNDARY CONDITIONS

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