On the global solvability of the axisymmetric Boussinesq system with critical regularity

Abstract

The current paper is principally motivated by establishing the global well-posedness to the three-dimensional Boussinesq system with zero diffusivity in the setting of axisymmetric flows without swirling with v0∈ H12(R3) B03,1(R3) and density 0∈ L2(R3) B03,1(R3). This respectively enhances the two results recently accomplished in Danchin-Paicu1, Hmidi-Rousset. Our formalism is inspired, in particular for the first part from Abidi concerning the axisymmetric Navier-Stokes equations once v0∈ H12(R3) and external force f∈ L2loc(R+;Hβ(R3)), with β>14. This latter regularity on f which is the density in our context is helpless to achieve the global estimates for Boussinesq system. This technical defect forces us to deal once again with a similar proof to that of Abidi but with f∈ Lβloc(R+;L2(R3)) for some β>4. Second, we explore the gained regularity on the density by considering it as an external force in order to apply the study already obtained to the Boussinesq system.