On the rigorous mathematical derivation for the viscous primitive equations with density stratification
From MaRDI portal
Publication:6159422
DOI10.1007/s10473-023-0306-1zbMath1524.35473arXiv2203.10529OpenAlexW4367368836MaRDI QIDQ6159422
Publication date: 5 May 2023
Published in: Acta Mathematica Scientia. Series B. (English Edition) (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2203.10529
strong convergenceBoussinesq equationshydrostatic approximationprimitive equationsdensity stratification
PDEs in connection with fluid mechanics (35Q35) Hydrology, hydrography, oceanography (86A05) PDEs in connection with geophysics (35Q86)
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Global strong \(L^{p}\) well-posedness of the 3D primitive equations with heat and salinity diffusion
- Strong solutions to the 3D primitive equations with only horizontal dissipation: near \(H^{1}\) initial data
- Local and global well-posedness of strong solutions to the 3D primitive equations with vertical Eddy diffusivity
- Global well-posedness of strong solutions to the 3D primitive equations with horizontal eddy diffusivity
- Global well-posedness of the \(3D\) primitive equations with partial vertical turbulence mixing heat diffusion
- On the uniqueness of \(z\)-weak solutions of the three-dimensional primitive equations of the ocean
- Ill-posedness of the hydrostatic Euler and Navier-Stokes equations
- On the uniqueness of weak solutions of the two-dimensional primitive equations.
- The primitive equations as the small aspect ratio limit of the Navier-Stokes equations: rigorous justification of the hydrostatic approximation
- Mathematical theory for the coupled atmosphere-ocean models (CAO III)
- Finite-time blowup and ill-posedness in Sobolev spaces of the inviscid primitive equations with rotation
- Global well-posedness of the 3D primitive equations with horizontal viscosity and vertical diffusivity
- The hydrostatic Stokes semigroup and well-posedness of the primitive equations on spaces of bounded functions
- Global well-posedness for the 3D primitive equations in anisotropic framework
- Finite-time blowup for the inviscid primitive equations of oceanic and atmospheric dynamics
- The regularity of solutions of the primitive equations of the ocean in space dimension three
- Global well-posedness of the three-dimensional viscous primitive equations of large scale ocean and atmosphere dynamics
- Existence of a solution `in the large' for the 3D large-scale ocean dynamics equations
- Global strong well-posedness of the three dimensional primitive equations in \({L^p}\)-spaces
- Ill-posedness of the hydrostatic Euler and singular Vlasov equations
- The primitive equations approximation of the anisotropic horizontally viscous \(3D\) Navier-Stokes equations
- Rigorous derivation of the full primitive equations by the scaled Boussinesq equations with rotation
- Mathematical Justification of the Hydrostatic Approximation in the Primitive Equations of Geophysical Fluid Dynamics
- Stability of Two-Dimensional Viscous Incompressible Flows under Three-Dimensional Perturbations and Inviscid Symmetry Breaking
- Existence and Uniqueness of Weak Solutions to Viscous Primitive Equations for a Certain Class of Discontinuous Initial Data
- Global Well-Posedness of the Three-Dimensional Primitive Equations with Only Horizontal Viscosity and Diffusion
- The Three-Dimensional Navier–Stokes Equations
- New formulations of the primitive equations of atmosphere and applications
- On the equations of the large-scale ocean
- Global well‐posedness and finite‐dimensional global attractor for a 3‐D planetary geostrophic viscous model
- On $H^2$ solutions and $z$-weak solutions of the 3D Primitive Equations
- Global well-posedness of z-weak solutions to the primitive equations without vertical diffusivity
- Rigorous justification of the hydrostatic approximation for the primitive equations by scaled Navier–Stokes equations*
- Primitive equations with continuous initial data
- On the regularity of the primitive equations of the ocean
- Blowup of solutions of the hydrostatic Euler equations
