OPTIMAL GEVREY STABILITY OF HYDROSTATIC APPROXIMATION FOR THE NAVIER-STOKES EQUATIONS IN A THIN DOMAIN
Published 2023 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
OPTIMAL GEVREY STABILITY OF HYDROSTATIC APPROXIMATION FOR THE NAVIER-STOKES EQUATIONS IN A THIN DOMAIN
Authors
Keywords
-
Journal
Journal of the Institute of Mathematics of Jussieu
Volume -, Issue -, Pages 1-46
Publisher
Cambridge University Press (CUP)
Online
2023-09-06
DOI
10.1017/s1474748023000282
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- Gevrey stability of hydrostatic approximate for the Navier–Stokes equations in a thin domain
- (2021) Chao Wang et al. NONLINEARITY
- On the L∞ stability of Prandtl expansions in the Gevrey class
- (2021) Qi Chen et al. Science China-Mathematics
- The Inviscid Limit for the Navier–Stokes Equations with Data Analytic Only Near the Boundary
- (2020) Igor Kukavica et al. ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
- Well-posedness of the hydrostatic Navier–Stokes equations
- (2020) David Gérard-Varet et al. Analysis & PDE
- On the hydrostatic approximation of the Navier-Stokes equations in a thin strip
- (2020) Marius Paicu et al. ADVANCES IN MATHEMATICS
- Well-posedness in Gevrey function spaces for the Prandtl equations with non-degenerate critical points
- (2019) Tong Yang et al. JOURNAL OF THE EUROPEAN MATHEMATICAL SOCIETY
- Well-posedness of the linearized Prandtl equation around a non-monotonic shear flow
- (2018) Dongxiang Chen et al. ANNALES DE L INSTITUT HENRI POINCARE-ANALYSE NON LINEAIRE
- The Inviscid Limit of Navier–Stokes Equations for Analytic Data on the Half-Space
- (2018) Toan T. Nguyen et al. ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
- On the zero-viscosity limit of the Navier–Stokes equations in R+3 without analyticity
- (2018) Mingwen Fei et al. JOURNAL DE MATHEMATIQUES PURES ET APPLIQUEES
- Gevrey stability of Prandtl expansions for $2$ -dimensional Navier–Stokes flows
- (2018) David Gérard-Varet et al. DUKE MATHEMATICAL JOURNAL
- Spectral instability of general symmetric shear flows in a two-dimensional channel
- (2016) Emmanuel Grenier et al. ADVANCES IN MATHEMATICS
- Well-posedness for the Prandtl system without analyticity or monotonicity
- (2015) David Gérard-Varet et al. ANNALES SCIENTIFIQUES DE L ECOLE NORMALE SUPERIEURE
- Finite-Time Blowup for the Inviscid Primitive Equations of Oceanic and Atmospheric Dynamics
- (2015) Chongsheng Cao et al. COMMUNICATIONS IN MATHEMATICAL PHYSICS
- Local-in-Time Existence and Uniqueness of Solutions to the Prandtl Equations by Energy Methods
- (2015) Nader Masmoudi et al. COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS
- On the Inviscid Limit Problem of the Vorticity Equations for Viscous Incompressible Flows in the Half-Plane
- (2014) Yasunori Maekawa COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS
- Well-posedness of the Prandtl equation in Sobolev spaces
- (2014) R. Alexandre et al. JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
- Blowup of solutions of the hydrostatic Euler equations
- (2014) Tak Kwong Wong PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
- On the Local Well-posedness of the Prandtl and Hydrostatic Euler Equations with Multiple Monotonicity Regions
- (2014) Igor Kukavica et al. SIAM JOURNAL ON MATHEMATICAL ANALYSIS
- On the H s Theory of Hydrostatic Euler Equations
- (2012) Nader Masmoudi et al. ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
- Vanishing Viscous Limits for 3D Navier–Stokes Equations with a Navier-Slip Boundary Condition
- (2012) Lizhen Wang et al. Journal of Mathematical Fluid Mechanics
- Local existence and uniqueness for the hydrostatic Euler equations on a bounded domain
- (2010) Igor Kukavica et al. JOURNAL OF DIFFERENTIAL EQUATIONS
- On the ill-posedness of the Prandtl equation
- (2010) David Gérard-Varet et al. JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
- Ill-posedness of the Hydrostatic Euler and Navier–Stokes Equations
- (2009) Michael Renardy ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
Find Funding. Review Successful Grants.
Explore over 25,000 new funding opportunities and over 6,000,000 successful grants.
ExploreAdd your recorded webinar
Do you already have a recorded webinar? Grow your audience and get more views by easily listing your recording on Peeref.
Upload Now