Abstract:

The contribution of this paper will be focused on the global existence and uniqueness topic in three-dimensional case of the axisymmetric viscous Boussinesq system in critical Lebesgue spaces. We aim at deriving analogous results for the classical two-dimensional and three-dimensional axisymmetric Navier-Stokes equations recently obtained in [19, 20]. Roughly speaking, we show essentially that if the initial data (v0; ρ0) is axisymmetric
and (!0; ρ0) belongs to the critical space L1(Ω) ×L1(R3), with !0 is the initial
vorticity associated to v0 and Ω = f(r; z) 2 R2 : r > 0g, then the viscous
Boussinesq system has a unique global solution.

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