On the Hydrostatic Approximation of the MHD Equations in a Thin Strip
From MaRDI portal
Publication:5037714
DOI10.1137/21M1425360zbMath1490.35350OpenAlexW4213246348MaRDI QIDQ5037714
Publication date: 4 March 2022
Published in: SIAM Journal on Mathematical Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/21m1425360
PDEs in connection with fluid mechanics (35Q35) Dependence of solutions to PDEs on initial and/or boundary data and/or on parameters of PDEs (35B30)
Related Items (3)
BV entropy solutions of two-dimensional nonstationary Prandtl boundary layer system ⋮ Limit stationary measures of the stochastic magnetohydrodynamic system in a 3D thin domain ⋮ Long time well‐posedness of two dimensional Magnetohydrodynamic boundary layer equation without resistivity
Cites Work
- Unnamed Item
- Unnamed Item
- Almost global existence for the Prandtl boundary layer equations
- Zero viscosity limit for analytic solutions of the primitive equations
- Zero-viscosity limit of the Navier-Stokes equations in the analytic setting
- Local existence and uniqueness for the hydrostatic Euler equations on a bounded domain
- On the hydrostatic approximation of the Navier-Stokes equations in a thin strip
- Magnetic effects on the solvability of 2D MHD boundary layer equations without resistivity in Sobolev spaces
- Ill-posedness of the hydrostatic Euler and Navier-Stokes equations
- Zero viscosity limit for analytic solutions, of the Navier-Stokes equation on a half-space. I: Existence for Euler and Prandtl equations
- On the global existence of solutions to the Prandtl's system.
- Well-posedness of the linearized Prandtl equation around a non-monotonic shear flow
- Hydrostatic approximation of the 2D MHD system in a thin strip with a small analytic data
- Well-posedness of the hydrostatic Navier-Stokes equations
- Well-posedness of the Prandtl equations without any structural assumption
- Well-posedness in Gevrey function spaces for the Prandtl equations with non-degenerate critical points
- Formal derivation and stability analysis of boundary layer models in MHD
- Well-posedness for the Prandtl system without analyticity or monotonicity
- Local-in-Time Existence and Uniqueness of Solutions to the Prandtl Equations by Energy Methods
- Fourier Analysis and Nonlinear Partial Differential Equations
- On the ill-posedness of the Prandtl equation
- Well-Posedness of the Boundary Layer Equations
- MHD Boundary Layers Theory in Sobolev Spaces Without Monotonicity I: Well‐Posedness Theory
- Well-posedness of the MHD Boundary Layer System in Gevrey Function Space without Structural Assumption
- Long Time Well-Posedness of the MHD Boundary Layer Equation in Sobolev Space
- Gevrey stability of hydrostatic approximate for the Navier–Stokes equations in a thin domain
- Justification of Prandtl Ansatz for MHD Boundary Layer
- Well-posedness of the Prandtl equation in Sobolev spaces
- On the Inviscid Limit Problem of the Vorticity Equations for Viscous Incompressible Flows in the Half‐Plane
- Long time well-posedness of Prandtl system with small and analytic initial data
This page was built for publication: On the Hydrostatic Approximation of the MHD Equations in a Thin Strip
