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Main Author: Ltifi, Maroua
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2405.19174
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author Ltifi, Maroua
author_facet Ltifi, Maroua
contents This study delves into a comprehensive examination of the three-dimensional $(3D)$ incompressible magneto-hydrodynamic $(MHD)$ equations in $H^{1}(\R^{3})$. The modification involves incorporating a power term in the nonlinear convection component, a particularly relevant adjustment in porous media scenarios, especially when the fluid adheres to the Darcy-Forchheimer law instead of the conventional Darcy law. Our main contributions include establishing global existence over time and demonstrating the uniqueness of solutions. It is important to note that these achievements are obtained with smallness conditions on the initial data, but under the condition that $β>3$ and $α>0$. However, when $β=3$, the problem is limited to the case $0<α<\frac{1}{2}$ as the above inequality is unsolvable for these values of $α$ using our method. To support our statement, we will add a "slight disturbance" of the function f of the type $f(z)=log(e+z^{2})$ or $\log(\log(e^{e}+z^{2}))$ or even $\log(\log(\log((e^{e})^{e}+z^{2})))$.
format Preprint
id arxiv_https___arxiv_org_abs_2405_19174
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Strong solution of the three-dimensional $(3D)$ incompressible magneto-hydrodynamic $(MHD)$ equationss with a modified damping
Ltifi, Maroua
Analysis of PDEs
This study delves into a comprehensive examination of the three-dimensional $(3D)$ incompressible magneto-hydrodynamic $(MHD)$ equations in $H^{1}(\R^{3})$. The modification involves incorporating a power term in the nonlinear convection component, a particularly relevant adjustment in porous media scenarios, especially when the fluid adheres to the Darcy-Forchheimer law instead of the conventional Darcy law. Our main contributions include establishing global existence over time and demonstrating the uniqueness of solutions. It is important to note that these achievements are obtained with smallness conditions on the initial data, but under the condition that $β>3$ and $α>0$. However, when $β=3$, the problem is limited to the case $0<α<\frac{1}{2}$ as the above inequality is unsolvable for these values of $α$ using our method. To support our statement, we will add a "slight disturbance" of the function f of the type $f(z)=log(e+z^{2})$ or $\log(\log(e^{e}+z^{2}))$ or even $\log(\log(\log((e^{e})^{e}+z^{2})))$.
title Strong solution of the three-dimensional $(3D)$ incompressible magneto-hydrodynamic $(MHD)$ equationss with a modified damping
topic Analysis of PDEs
url https://arxiv.org/abs/2405.19174