The Hydrostatic Approximation for the Primitive Equations by the Scaled Navier-Stokes Equations under the No-Slip Boundary Condition

Abstract

In this paper we justify the hydrostatic approximation of the primitive equations in the maximal Lp-Lq-setting in the three-dimensional layer domain = 2 × (-1, 1) under the no-slip (Dirichlet) boundary condition in any time interval (0, T) for T>0. We show that the solution to the scaled Navier-Stokes equations with Besov initial data u0 ∈ Bsq,p() for s > 2 - 2/p + 1/ q converges to the solution to the primitive equations with the same initial data in E1 (T) = W1, p(0, T ; Lq ()) Lp(0, T ; W2, q ()) with order O(ε) where (p,q) ∈ (1,∞)2 satisfies 1p ≤ 1 - 1/q, 3/2 - 2/q . The global well-posedness of the scaled Navier-Stokes equations in E1 (T) is also proved for sufficiently small ε>0. Note that T = ∞ is included.