Stability of one-dimensional boundary layers by using green's functions

Emmanuel Grenier; Frédéric Rousset

doi:10.1002/cpa.10006

Stability of one-dimensional boundary layers by using green's functions

Emmanuel Grenier
, Frédéric Rousset

Unité de Mathématiques Pures et Appliquées de l'ENS de Lyon

科研成果: 期刊稿件 › 文章 › 同行评审

48 引用（Scopus）

摘要

The aim of this paper is to investigate the stability of one-dimensional boundary layers of parabolic systems as the viscosity goes to 0 in the noncharacteristic case and, more precisely, to prove that spectral stability implies linear and nonlinear stability of approximate solutions. In particular, we replace the smallness condition obtained by the energy method [10, 13] by a weaker spectral condition.

源语言	英语
页（从-至）	1343-1385
页数	43
期刊	Communications on Pure and Applied Mathematics
卷	54
期	11
DOI	https://doi.org/10.1002/cpa.10006
出版状态	已出版 - 11月 2001
已对外发布	是

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AB - The aim of this paper is to investigate the stability of one-dimensional boundary layers of parabolic systems as the viscosity goes to 0 in the noncharacteristic case and, more precisely, to prove that spectral stability implies linear and nonlinear stability of approximate solutions. In particular, we replace the smallness condition obtained by the energy method [10, 13] by a weaker spectral condition.

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Stability of one-dimensional boundary layers by using green's functions

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