具有Neumann边界条件的双曲抛物型系统中的粘性边界层

IF 1.3 1区 数学 Q1 MATHEMATICS Annales Scientifiques De L Ecole Normale Superieure Pub Date : 2012-07-29 DOI:10.24033/ASENS.2213
O. Guès, G. Métivier, Mark E. Williams, K. Zumbrun
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引用次数: 1

摘要

研究了具有Neumann边界条件的双曲抛物型问题的非特征边界层。更一般地,我们研究了具有Dirichlet{Neumann混合边界条件的边界层,其中Dirichlet条件的数量少于进入区域的双曲特征模态的数量,即指定外双曲解所需的边界条件的数量。我们以前已经证明,这种情况阻止了通常的WKB近似,它涉及纯狄利克雷条件下的外解。它还排除了关于边界层的双曲抛物问题的线性化的通常的极大估计。在这里,我们证明了对于线性,常系数t,双曲-抛物型问题,人们得到了一个简化的双曲问题,满足诺伊曼或混合狄利克雷{诺伊曼而不是狄利克雷边界条件。当该双曲型问题得到解决时,就可以构造出唯一的形式边界层展开式。在纯诺伊曼条件和完全传入特征的极端情况下,我们对拟线性情况进行了全面的分析,得到了所有阶的边界层近似,并进行了严格的误差分析。作为一个推论,我们描述了这个问题的小粘度极限。分析表明,虽然相关的线性化双曲和双曲抛物问题不满足狄利克雷条件下通常的极大估计,但它们确实满足具有损失的类似版本。双曲线系统的极限粘滞性(抛物线系统的极限粘滞性)取决于诺伊曼极限
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Viscous boundary layers in hyperbolic-parabolic systems with Neumann boundary conditions
We initiate the study of noncharacteristic boundary layers in hyperbolic-parabolic problems with Neumann boundary conditions. More generally, we study boundary layers with mixed Dirichlet{Neumann boundary conditions where the number of Dirichlet conditions is fewer than the number of hyperbolic characteristic modes entering the domain, that is, the number of boundary conditions needed to specify an outer hyperbolic solution. We have shown previously that this situation prevents the usual WKB approximation involving an outer solution with pure Dirichlet conditions. It also rules out the usual maximal estimates for the linearization of the hyperbolic-parabolic problem about the boundary layer. Here we show that for linear, constant-coecien t, hyperbolic-parabolic problems one obtains a reduced hyperbolic problem satisfying Neumann or mixed Dirichlet{Neumann rather than Dirichlet boundary conditions. When this hyperbolic problem can be solved, a unique formal boundary-layer expansion can be constructed. In the extreme case of pure Neumann conditions and totally incoming characteristics, we carry out a full analysis of the quasilinear case, obtaining a boundary-layer approximation to all orders with a rigorous error analysis. As a corollary we characterize the small viscosity limit for this problem. The analysis shows that although the associated linearized hyperbolic and hyperbolic{parabolic problems do not satisfy the usual maximal estimates for Dirichlet conditions, they do satisfy analogous versions with losses. Couches limites visqueuses pour des syst emes hyperboliques{paraboliques avec condition aux limites de Neumann
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来源期刊
CiteScore
3.00
自引率
5.30%
发文量
25
审稿时长
>12 weeks
期刊介绍: The Annales scientifiques de l''École normale supérieure were founded in 1864 by Louis Pasteur. The journal dealt with subjects touching on Physics, Chemistry and Natural Sciences. Around the turn of the century, it was decided that the journal should be devoted to Mathematics. Today, the Annales are open to all fields of mathematics. The Editorial Board, with the help of referees, selects articles which are mathematically very substantial. The Journal insists on maintaining a tradition of clarity and rigour in the exposition. The Annales scientifiques de l''École normale supérieures have been published by Gauthier-Villars unto 1997, then by Elsevier from 1999 to 2007. Since January 2008, they are published by the Société Mathématique de France.
期刊最新文献
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