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Main Author: Charve, Frédéric
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2311.11731
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author Charve, Frédéric
author_facet Charve, Frédéric
contents The asymptotics of the strongly stratified Boussinesq system when the Froude number goes to zero have been previously investigated, but the resulting limit system surprisingly did not depend on the thermal diffusivity $ν$ ' . In this article we obtain richer asymptotics (depending on $ν$ ' ) for more general initial data.As for the rotating fluids system, the only way to reach this limit consists in considering non-conventional initial data: to a function classically depending on the full space variable, we add a second one only depending on the vertical coordinate.Thanks to a refined study of the structure of the limit system and to new adapted Strichartz estimates, we obtain convergence in the context of weak Leray-type solutions providing explicit convergence rates when possible. In the usually simpler case $ν$ = $ν$ ' we are able to improve the Strichartz estimates and the convergence rates. The last part of the appendix is devoted to the proof (by elementary techniques) of a new and crucial dispersion estimate, as classical methods fail.Finally, our theorems can also be rewritten as a global existence result and asymptotic expansion for the classical Boussinesq system near an explicit stationary solution and for non-conventional vertically stratified initial data.
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publishDate 2023
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spellingShingle Hidden asymptotics for the weak solutions of the strongly stratified Boussinesq system without rotation
Charve, Frédéric
Analysis of PDEs
The asymptotics of the strongly stratified Boussinesq system when the Froude number goes to zero have been previously investigated, but the resulting limit system surprisingly did not depend on the thermal diffusivity $ν$ ' . In this article we obtain richer asymptotics (depending on $ν$ ' ) for more general initial data.As for the rotating fluids system, the only way to reach this limit consists in considering non-conventional initial data: to a function classically depending on the full space variable, we add a second one only depending on the vertical coordinate.Thanks to a refined study of the structure of the limit system and to new adapted Strichartz estimates, we obtain convergence in the context of weak Leray-type solutions providing explicit convergence rates when possible. In the usually simpler case $ν$ = $ν$ ' we are able to improve the Strichartz estimates and the convergence rates. The last part of the appendix is devoted to the proof (by elementary techniques) of a new and crucial dispersion estimate, as classical methods fail.Finally, our theorems can also be rewritten as a global existence result and asymptotic expansion for the classical Boussinesq system near an explicit stationary solution and for non-conventional vertically stratified initial data.
title Hidden asymptotics for the weak solutions of the strongly stratified Boussinesq system without rotation
topic Analysis of PDEs
url https://arxiv.org/abs/2311.11731