Add to ORKGThe concern of this paper is the Cauchy problem for the Prandtl equation. This problem is known to be well-posed for analytic data or for data with monotonicity properties. We prove here that it is linearly ill-posed in Sobolev type spaces. The key of the analysis is the construction, at high tangential frequencies, of unstable quasimodes for the linearization around solutions with non-degenerate critical points. Interestingly, the strong instability is due to vicosity, which is coherent with well-posedness results obtained for the inviscid version of the equation. A numerical study of this instability is also provided
International audienceUnder the hypothesis of analyticity of the data with respect to the tangential...
In this paper, we investigate the long time existence and uniqueness of small solution to d, for d =...
In this version, reviser some typos, 43 pages.In this paper, we study the long time well-posedness ...
AbstractIn a recent result of Gérard-Varet and Dormy (2010) [4], they established ill-posedness for ...
We consider the mild solutions of the Prandtl equations on the half space. Requiring analyticity onl...
We develop a new approach to study the well-posedness theory of the Prandtl equation in Sobolev spac...
In this paper we shall be concerned with Prandtl's equations with incompatible data, i.e. with initi...
The validity of the inviscid limit for the incompressible Navier-Stokes equations is one of the most...
We provide a simple proof that the Cauchy problem for the incompressible Euler equations in $\mathbb...
AbstractIn this paper we establish a global existence of weak solutions to the two-dimensional Prand...
2017-07-19We address the regularity and stability problems of the following partial differential equ...
It is well known that the Prandtl boundary layer equation is instable, and the well-posedness in Sob...
We study the Cauchy problem for non-linear (semilinear) elliptic partial differential equations in H...
We consider a steady, geophysical 2D fluid in a domain, and focus on its western boundary layer, whi...
This thesis deals with equations of fluid dynamics. We consider the following two models: one is the...
International audienceUnder the hypothesis of analyticity of the data with respect to the tangential...
In this paper, we investigate the long time existence and uniqueness of small solution to d, for d =...
In this version, reviser some typos, 43 pages.In this paper, we study the long time well-posedness ...
AbstractIn a recent result of Gérard-Varet and Dormy (2010) [4], they established ill-posedness for ...
We consider the mild solutions of the Prandtl equations on the half space. Requiring analyticity onl...
We develop a new approach to study the well-posedness theory of the Prandtl equation in Sobolev spac...
In this paper we shall be concerned with Prandtl's equations with incompatible data, i.e. with initi...
The validity of the inviscid limit for the incompressible Navier-Stokes equations is one of the most...
We provide a simple proof that the Cauchy problem for the incompressible Euler equations in $\mathbb...
AbstractIn this paper we establish a global existence of weak solutions to the two-dimensional Prand...
2017-07-19We address the regularity and stability problems of the following partial differential equ...
It is well known that the Prandtl boundary layer equation is instable, and the well-posedness in Sob...
We study the Cauchy problem for non-linear (semilinear) elliptic partial differential equations in H...
We consider a steady, geophysical 2D fluid in a domain, and focus on its western boundary layer, whi...
This thesis deals with equations of fluid dynamics. We consider the following two models: one is the...
International audienceUnder the hypothesis of analyticity of the data with respect to the tangential...
In this paper, we investigate the long time existence and uniqueness of small solution to d, for d =...
In this version, reviser some typos, 43 pages.In this paper, we study the long time well-posedness ...