Global well-posedness and stability of the 2D Boussinesq equations with partial dissipation near a hydrostatic equilibrium

Abstract

The paper is devoted to investigating the well-posedness, stability and large-time behavior near the hydrostatic balance for the 2D Boussinesq equations with partial dissipation. More precisely, the global well-posedness is obtained in the case of partial viscosity and without thermal diffusion for the initial data belonging to Hδ(R2) × Hs(R2) for δ ∈ [s-1,s+1] if s ∈ R, s > 2, for δ ∈ (1,s+1] if s ∈ (0,2] and for δ ∈ [0,1] if s = 0. In addition, if one has either horizontal or vertical thermal diffusion then the stability and large-time behavior are provided in Hm(R2), m ∈ N and in Hm-1(R2) with m ∈ N, m ≥ 2, respectively.