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From anisotropic Navier-Stokes equations to primitive equations for the ocean and atmosphere

Published 3 Jun 2024 in math.AP | (2406.01104v1)

Abstract: We study the well-posedness of the primitive equations for the ocean and atmosphere on two particular domains : a bounded domain $\Omega_1 := (-1, 1)3$ with periodic boundary conditions and the strip $\Omega_2 := \mathbb{R}2 \times (-1, 1)$ with a periodic boundary condition for the vertical coordinate. An existence theorem for global solutions on a suitable Besov space is derived. Then, in a second step, we rigorously justify the passage to the limit from the rescaled anisotropic Navier-Stokes equations to these primitive equations in the same functional framework as that found for the solutions of the primitive equations.

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