Add to ORKGIt is well known that the regularity of solutions to Navier-Stokes equation is controlled by the boundedness in time of the enstrophy. However, there is no proof of the existence of such bound. In fact, standard estimates for the instantaneous rate of growth of the enstrophy lead to finite time blow up, when straightforward time integration of the estimate is used. Moreover, there is recent numerical evidence to support the sharpness of these instantaneous estimates for any given instant of time. The central question is therefore, how to extend these instantaneous estimates to a finite time interval (0, T] in such a way that the dynamics imposed by the PDE are taken into account. We state the problem of saturation of finite time estimates f...
We contribute an answer to a quantitative variant of the question raised in [Coron, Contemp. Math 20...
Spatial analyticity properties of the solution to Burgers' equation with generic initial data a...
International audienceWe contribute an answer to a quantitative variant of the question raised in [C...
We use the Cole–Hopf transformation and the Laplace method for the heat equation to justify the nume...
It is still an open problem whether smooth solutions to the 3D Navier-Stokes equations lose regulari...
We compare freely decaying evolution of the Navier-Stokes equations with that of the 3D Burgers equa...
We consider enstrophy dissipation in two-dimensional (2D) Navier-Stokes flows and focus on how this ...
For Burgers equations with real data and complex forcing terms, Lerner, Morimoto and Xu proved that ...
For Burgers equations with real data and complex forcing terms, Lerner, Morimoto and Xu proved that ...
We investigate the phenomenon of the time-delay in the instabilities exhibited by the Cauchy problem...
In this paper, we discuss the efficiency of various numerical methods for the inverse design of the ...
ABSTRACT. In this paper we control the first moment of the ini-tial approximations and obtain the or...
In this paper we present rigorous a posteriori L2 error bounds for reduced basis approximations of t...
ii One of the most prominent open problems in mathematical physics is determin-ing whether solutions...
In this paper, we discuss the efficiency of various numerical methods for the inverse desi...
We contribute an answer to a quantitative variant of the question raised in [Coron, Contemp. Math 20...
Spatial analyticity properties of the solution to Burgers' equation with generic initial data a...
International audienceWe contribute an answer to a quantitative variant of the question raised in [C...
We use the Cole–Hopf transformation and the Laplace method for the heat equation to justify the nume...
It is still an open problem whether smooth solutions to the 3D Navier-Stokes equations lose regulari...
We compare freely decaying evolution of the Navier-Stokes equations with that of the 3D Burgers equa...
We consider enstrophy dissipation in two-dimensional (2D) Navier-Stokes flows and focus on how this ...
For Burgers equations with real data and complex forcing terms, Lerner, Morimoto and Xu proved that ...
For Burgers equations with real data and complex forcing terms, Lerner, Morimoto and Xu proved that ...
We investigate the phenomenon of the time-delay in the instabilities exhibited by the Cauchy problem...
In this paper, we discuss the efficiency of various numerical methods for the inverse design of the ...
ABSTRACT. In this paper we control the first moment of the ini-tial approximations and obtain the or...
In this paper we present rigorous a posteriori L2 error bounds for reduced basis approximations of t...
ii One of the most prominent open problems in mathematical physics is determin-ing whether solutions...
In this paper, we discuss the efficiency of various numerical methods for the inverse desi...
We contribute an answer to a quantitative variant of the question raised in [Coron, Contemp. Math 20...
Spatial analyticity properties of the solution to Burgers' equation with generic initial data a...
International audienceWe contribute an answer to a quantitative variant of the question raised in [C...