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Title: Global weak solvability of a regularized system of the Navier-Stokes equations for compressible fluid (English)
Author: Neustupa, Jiří
Language: English
Journal: Aplikace matematiky
ISSN: 0373-6725
Volume: 33
Issue: 5
Year: 1988
Pages: 389-409
Summary lang: English
Summary lang: Russian
Summary lang: Czech
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Category: math
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Summary: The paper contains the proof of global existence of weak solutions to the mixed initial-boundary value problem for a certain modification of a system of equations of motion of viscous compressible fluid. The modification is based on an application of an operator of regularization to some terms appearing in the system of equations and it does not contradict the laws of fluid mechanics. It is assumed that pressure is a known function of density. The method of discretization in time is used and finally, a so called energy inequality is derived. The inequality is independent on the regularization used. (English)
Keyword: Navier-Stoke equations
Keyword: method of a discretization in time
Keyword: global existence of weak solutions
Keyword: mixed initial-boundary value problem
Keyword: viscous compressible fluid
MSC: 35A05
MSC: 35D05
MSC: 35Q10
MSC: 35Q30
MSC: 76N10
idZBL: Zbl 0668.76074
idMR: MR0961316
DOI: 10.21136/AM.1988.104319
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Date available: 2008-05-20T18:35:21Z
Last updated: 2020-07-28
Stable URL: http://hdl.handle.net/10338.dmlcz/104319
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Reference: [1] O. A. Ladyzhenskaya N. N. Uralceva: Linear and Quasilinear Equations of the Elliptic Type.Nauka, Moscow, 1973 (Russian). MR 0509265
Reference: [2] L. G. Loicianskij: Mechanics of Liquids and Gases.Nauka, Moscow, 1973 (Russian).
Reference: [3] A. Matsumura T. Nishida: The Initical Value Problem for the Equations of Motion of Viscous and Heat-Conductive Gases.J. Math. Kyoto Univ. 20 (1980), 67-104, MR 0564670, 10.1215/kjm/1250522322
Reference: [4] J. Neustupa: A Note to the Global Weak Solvability of the Navier-Stokes Equations for Compressible Fluid.to appear prob. in Apl. mat. MR 0961316
Reference: [5] R. Rautmann: The Uniqueness and Regularity of the Solutions of Navier-Stokes Problems.Functional Theoretic Methods for Partial Differential Equations, Proc. conf. Darmstadt 1976, Lecture Notes in Mathematics, Vol. 561, Berlin-Heidelberg-New York, Springer-Verlag, 1976, 378-393. Zbl 0383.35059, MR 0463727
Reference: [6] V. A. Sollonikov: The Solvability of an Initial-Boundary Value Problem for the Equations of Motion of Viscous Compressible Fluid.J. Soviet Math. 14 (1980), 1120-1133 (previously in Zap. Nauchn. Sem. LOMI 56 (1976), 128-142 (Russian)). MR 0481666, 10.1007/BF01562053
Reference: [7] R. Temam: Navier-Stokes Equations.North-Holland Publishing Company, Amsterdam- New York-Oxford, 1977. Zbl 0383.35057, MR 0769654
Reference: [8] A. Valli: An Existence Theorem for Compressible Viscous Fluids.Ann. Mat. Рurа Appl. 130 (1982), 197-213. Zbl 0599.76082, MR 0663971, 10.1007/BF01761495
Reference: [9] A. Valli: Periodic and Stationary Solutions for Compressible Navier-Stokes Equations via a Stability Method.Ann. Scuola Norm. Sup. Pisa, (IV) 10 (1983), 607-647. Zbl 0542.35062, MR 0753158
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