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arxiv: 2107.07688 · v1 · pith:DO33O7UV · submitted 2021-07-16 · math.AP · math-ph· math.MP

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

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classification math.AP math-phmath.MP
keywords equationsinitialcylindricaldiffusivityeddyglobalonlyprimitive
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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 $L^2$. This not only extends the results in \cite{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 $H^2$ there.

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