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Global Well-Posedness and Convergence Results for the 3D-Regularized Boussinesq System

Published online by Cambridge University Press:  20 November 2018

Ridha Selmi*
Affiliation:
Mathematics Department, Faculty of Sciences of Gabés, University of Gabés, Cité Erriadh, 6072 Zrig, Gabés, Tunisia and PDEs and Applications Lab, Faculty of Sciences of Tunis, University of Tunis El Manar, Campus Universitaire, 2092 El Manar, Tunis, Tunisia email: [email protected]
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Abstract

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Analytical study of the regularization of the Boussinesq system is performed in frequency space using Fourier theory. Existence and uniqueness of weak solutions with minimum regularity requirement are proved. Convergence results of the unique weak solution of the regularized Boussinesq system to a weak Leray–Hopf solution of the Boussinesq system are established as the regularizing parameter $\alpha$ vanishes. The proofs are done in the frequency space and use energy methods, the Arselà-Ascoli compactness theorem and a Friedrichs-like approximation scheme.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 2012

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