The hydrostatic approximation of the Boussinesq equations with rotation in a thin domain

Abstract

In this paper, we improve the global existence result in [9] slightly. More precisely, the global existence of strong solutions to the primitive equations with only horizontal viscosity and diffusivity is obtained under the assumption of initial data (v0,T0) ∈ H1 with ∂z v0 ∈ L4. Moreover, we prove that the scaled Boussinesq equations with rotation strongly converge to the primitive equations with only horizontal viscosity and diffusivity, in the cases of H1 initial data, H1 initial data with additional regularity ∂z v0 ∈ L4 and H2 initial data, respectively, as the aspect ration parameter λ goes to zero, and the rate of convergence is of the order O(λη/2) with η=\2,β-2,γ-2\(2<β,γ<∞). The convergence result implies a rigorous justification of the hydrostatic approximation.