Strong solutions for the compressible barotropic fluid model of Korteweg type in the bounded domain

This paper is concerned with a barotropic model of capillary compressible fluids derived by Dunn and Serrin (1985). We consider the initial boundary value problem in bounded domains of R d ( d = 2 , 3 ) with more general pressure including Van der Waals equation of state. First, the local in time ex...

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Bibliographic Details
Published in:Zeitschrift für angewandte Mathematik und Physik 2020-06, Vol.71 (3), Article 85
Main Author: Hong, Hakho
Format: Article
Language:English
Subjects:
Boundary value problems
Compressible fluids
Computational fluid dynamics
Domains
Energy methods
Engineering
Equations of state
Mapping
Mathematical Methods in Physics
Perturbation
Sobolev space
Theoretical and Applied Mechanics
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Summary:This paper is concerned with a barotropic model of capillary compressible fluids derived by Dunn and Serrin (1985). We consider the initial boundary value problem in bounded domains of R d ( d = 2 , 3 ) with more general pressure including Van der Waals equation of state. First, the local in time existence and uniqueness of strong solutions is proved for initial data belonging to the Sobolev space W 2 2 × W 2 1 , relying on a new linearization technique and the contraction mapping principle. Next, we show that there exists a global unique strong solution by the continuation argument of local solution under small initial perturbation. The proof is based on the elementary energy method, but with a new development, where some techniques are introduced to establish the uniform energy estimates and to treat the pressure function with non-increasing property.
ISSN:0044-2275
1420-9039
DOI:10.1007/s00033-020-01306-8