一类高阶Stokes谱解算器的数值评估

IF 0.8 4区 数学 数学研究 Pub Date : 2018-06-01 DOI:10.4208/jms.v51n1.18.01
E. Ahusborde
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引用次数: 0

摘要

众所周知,在约束条件下线性算子的特征值和相关特征函数的逼近是一个难题。难点之一是如何提出稳定而精确地满足特征值方程、约束方程和边界条件的近似方法。使用任何非稳定方法都会导致非物理特征值的存在:称为虚假模式的多个零和称为污染模式的非零。消除这两个族的一种方法是通过完全满足约束方程来支持约束方程并用弱方法验证特征值方程的方程。为了说明我们在这一领域的贡献,本文考虑Stokes算子的情况。我们描述了几种产生正确数目的特征值的方法。我们用数值方法证明了这些方法是如何足以正确求解二维Stokes特征值问题的。AMS学科分类:76D07, 65N35, 34L16
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Numerical Assessment of a Class of High Order Stokes Spectrum Solver
It is well known that the approximation of eigenvalues and associated eigenfunctions of a linear operator under constraint is a difficult problem. One of the difficulties is to propose methods of approximation which satisfy in a stable and accurate way the eigenvalues equations, the constraint one and the boundary conditions. Using any non-stable method leads to the presence of non-physical eigenvalues: a multiple zero one called spurious modes and non-zero one called pollution modes. One way to eliminate these two families is to favor the constraint equations by satisfying it exactly and to verify the equations of the eigenvalues equations in weak ways. To illustrate our contribution in this field we consider in this paper the case of Stokes operator. We describe several methods that produce the correct number of eigenvalues. We numerically prove how these methods are adequate to correctly solve the 2D Stokes eigenvalue problem. AMS subject classifications: 76D07, 65N35, 34L16
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数学研究
数学研究 MATHEMATICS-
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