Abstract
The present paper is devoted to the study of the global well-posedness for the two-dimensional nonlinear Boussinesq equations with vertical dissipation. In the absence of horizontal dissipation, we establish a growth estimate on vertical component of velocity, that is, supp⩾2‖u2(t)‖Lpplogp which is close to ‖u2(t)‖L∞ and is bounded via the low-high decomposition technique. This together with the smoothing effect in vertical direction enables us to obtain the H1-estimate for velocity. Based on this, we prove the existence and uniqueness of classical solution without smallness assumptions. In addition, we also discuss the global well-posedness result for the rough initial data.
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