Global well-posedness of z-weak solutions to the primitive equations without vertical diffusivity

Abstract

In this paper, we consider the initial boundary value problem in a cylindrical domain to the three dimensional primitive equations with full eddy viscosity in the momentum equations but with only horizontal eddy diffusivity in the temperature equation. Global well-posedness of z-weak solution is established for any such initial datum that itself and its vertical derivative belong to L2. This not only extends the results in Cao5 from the spatially periodic case to general cylindrical domains but also weakens the regularity assumptions on the initial data which are required to be H2 there.