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The construction of Ekman boundary layer solutions near the non-flat boundaries presents a complex challenge, with limited research on this issue. In Masmoudi's pioneering work [Comm. Pure Appl. Math. 53 (2000), 432--483], the Ekman boundary layer solution was investigated on the domain $\mathbb{T}^2\times [\varepsilon f(x,y), 1]$, where $\varepsilon$ is a small constant and $f(x,y)$ denotes a periodic smooth function. This study investigates the influence of the geometric structure of the boundary $B(x,y)$ within the boundary layer. Specifically, for well-prepared initial data in the domain $\mathbb{R}^2\times[B(x,y), B(x,y)+2]$, if the boundary surface $B(x,y)$ is smooth and satisfies certain geometric constraints concerning its Gaussian and mean curvatures, then we derive an approximate boundary layer solution. Additionally, according to the curvature and incompressible conditions, the limit system we constructed is a 2D primitive system with damping and rotational effects. From the model's background, it reflects the characteristics arising from rotational effects. Finally, we validate the convergence of this approximate solution. No smallness condition on the amplitude of boundary $B(x, y)$ is required. |
