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Listar Artículos (Ecuaciones Diferenciales y Análisis Numérico) por autor "Amrouche, Chérif"
Mostrando ítems 1-7 de 7
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Artículo
On the regularity for the Laplace equation and the Stokes system
Amrouche, Chérif; Rodríguez Bellido, María Ángeles (Real Academia de Ciencias de Zaragoza, 2012)The purpose of this work is to show a broad framework in which the theory of very weak solutions for the Dirichlet stationary ...
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On the very weak solution for the Oseen and Navier-Stokes equations
Amrouche, Chérif; Rodríguez Bellido, María Ángeles (American Institute of Mathematical Sciences, 2010-06)We study the existence of very weak solutions regularity for the Stokes, Oseen and NavierStokes system when non-smooth ...
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Artículo
Stationary Stokes, Oseen and Navier-Stokes equations with singular data
Amrouche, Chérif; Rodríguez Bellido, María Ángeles (Springer, 2011)The concept of very weak solution introduced by Giga [20] for the Stokes equations has been hardly studied in the last ...
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Artículo
The Oseen and Navier-Stokes equations in a non-solenoidal framework
Amrouche, Chérif; Rodríguez Bellido, María Ángeles (Wiley, 2014-12-11)The very weak solution for the Stokes, Oseen and Navier-Stokes equations has been studied by several authors in the last ...
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Very weak solutions for the stationary Oseen and Navier–Stokes equations
Amrouche, Chérif; Rodríguez Bellido, María Ángeles (Elsevier, 2010)We consider the stationary Oseen and Navier–Stokes equations in a bounded connected domain of class C1,1 of R3. Here we ...
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Artículo
Very weak solutions for the stationary Stokes equations
Amrouche, Chérif; Rodríguez Bellido, María Ángeles (Elsevier, 2010-02)The concept of very weak solution introduced by Giga [9] for the stationary Stokes equations has been intensively studied ...
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Artículo
Weak solutions for the Oseen system in 2D and when the given velocity is not sufficiently regular
Amrouche, Chérif; Rodríguez Bellido, María Ángeles (Elsevier, 2019-05-15)The aim of this work is twofold: proving the existence of solution (u,π)∈H1(Ω)×L2(Ω) in bounded domains of R2 and the whole ...