Boussinesq system with non-homogeneous boundary conditions

Abstract: A classical stationary Boussinesq system with non-homogeneous Dirichlet boundary conditions in a bounded domain Ω ⊂ R 3 is considered in this paper; included is the case of a possibly disconnected boundary. We prove existence of a weak, a strong and a very weak solution in L p -theory. Uniqueness of the very weak solution is proved under a small data assumption.

“…For any f , g ∈ L q (Ω), L q (Ω), there exists a solution (generally not unique) (y e , θ e , π e ) ∈ (W 2,q (Ω) ∩ W 1,q 0 (Ω)) × (W 2,q (Ω) ∩ W 1,q 0 (Ω)) × (W 1,q (Ω)/R). See [3], [4], [5] for q = 2. In the Hilbert space setting, see [19], [27], [74], [90], [44].…”

Finite dimensional boundary uniform stabilization of the Boussinesq system in Besov spaces by critical use of Carleman estimate-based inverse theory

“…For any f , g ∈ L q (Ω), L q (Ω), there exists a solution (generally not unique) (y e , θ e , π e ) ∈ (W 2,q (Ω) ∩ W 1,q 0 (Ω)) × (W 2,q (Ω) ∩ W 1,q 0 (Ω)) × (W 1,q (Ω)/R). See [3], [4], [5] for q = 2. In the Hilbert space setting, see [19], [27], [74], [90], [44].…”

Finite dimensional boundary uniform stabilization of the Boussinesq system in Besov spaces by critical use of Carleman estimate-based inverse theory

The Steady Boussinesq System

Unique Continuation Properties of Static Over-determined Eigenproblems: The Ignition Key for Uniform Stabilization of Dynamic Fluids by Feedback Controllers