Quasi-geostrophic equations with initial data in Banach spaces of local measures
Electronic journal of differential equations, Tome 2005 (2005)
This paper studies the well posedness of the initial value problem for the quasi-geostrophic type equations
where $0 less than \gamma\leq 1 is a fixed parameter and the velocity field $u=(u_1,u_2,...,u_d) $ is divergence free; i.e., $nablau=0)$. The initial data $theta_0$ is taken in Banach spaces of local measures (see text for the definition), such as Multipliers, Lorentz and Morrey-Campanato spaces. We will focus on the subcritical case $1/2 less than gammaleq1 and we analyse the well-posedness of the system in three basic spaces: $L^{d/r,\infty}, \dot {X}_{r}$ and $\dot {M}^{p,d/r}$, when the solution is global for sufficiently small initial data. Furtheremore, we prove that the solution is actually smooth. Mild solutions are obtained in several spaces with the right homogeneity to allow the existence of self-similar solutions.
| $\displaylines{ \partial_{t}\theta+u\nabla\theta+( -\Delta) ^{\gamma}\theta =0 \quad \hbox{on }\mathbb{R}^{d}\times] 0,+\infty[\cr \theta( x,0) =\theta_{0}(x), \quad x\in\mathbb{R}^{d} }$ |
Classification :
35Q35, 35A07
Keywords: quasi-geostrophic equation, local spaces, mild solutions, self-similar solutions
Keywords: quasi-geostrophic equation, local spaces, mild solutions, self-similar solutions
@article{EJDE_2005__2005__a50,
author = {Gala, Sadek},
title = {Quasi-geostrophic equations with initial data in {Banach} spaces of local measures},
journal = {Electronic journal of differential equations},
year = {2005},
volume = {2005},
zbl = {1070.35031},
language = {en},
url = {http://geodesic.mathdoc.fr/item/EJDE_2005__2005__a50/}
}
Gala, Sadek. Quasi-geostrophic equations with initial data in Banach spaces of local measures. Electronic journal of differential equations, Tome 2005 (2005). http://geodesic.mathdoc.fr/item/EJDE_2005__2005__a50/