We reconsider the reduction method introduced for Hamiltonian systems by Amann, Conley and Zehnder. We propose an extension of these techniques to evolutive PDE systems of dissipative type and prove that, under suitable regularity conditions, a finite number of spectral modes controls exactly the time evolution of the complete problem. The problem of finite reduction for a two-dimensional modified Navier–Stokes equations is considered and an estimate of the dimension of the reduced space is given, valid for any time t > 0. Comparison is made with the asymptotic finite dimension that has been obtained for the true Navier–Stokes equations
First author draftThe two dimensional incompressible Navier–Stokes equation on := [0,2] × [0,2] wit...
The uniformly damped Korteweg¿de Vries (KdV) equation with periodic boundary conditions can be viewe...
We introduce here a simple finite-dimensional feedback control scheme for stabilizing solutions of i...
AbstractWe reconsider the reduction method introduced for Hamiltonian systems by Amann, Conley and Z...
An apparent paradox in classical statistical physics is the mechanism by which conservative, time-re...
AbstractIn this paper we study the reductions of evolutionary PDEs on the manifold of the stationary...
We consider a modification of the three-dimensional Navier-Stokes equations and other hydrodynamic...
Abstract: We consider a general class of evolution equations with nonlinear dissipation. Under minim...
This paper is devoted to the problem of finite-dimensional reduction for parabolic partial different...
We consider model order reduction of parameterized Hamiltonian systems describing nondissipative phe...
We consider model order reduction of parameterized Hamiltonian systems describing nondissipative phe...
The determining modes for the two-dimensional incompressible Navier-Stokes equations (NSE) are shown...
Abstract: In this set of lectures I will describe how one can use ideas of dynamical sys-tems theory...
We consider a Navier–Stokes–Voigt fluid model where the instantaneous kinematic viscosity has been c...
In many finite and infinite dimensional systemslow-dimensional behaviour is often observed. That is ...
First author draftThe two dimensional incompressible Navier–Stokes equation on := [0,2] × [0,2] wit...
The uniformly damped Korteweg¿de Vries (KdV) equation with periodic boundary conditions can be viewe...
We introduce here a simple finite-dimensional feedback control scheme for stabilizing solutions of i...
AbstractWe reconsider the reduction method introduced for Hamiltonian systems by Amann, Conley and Z...
An apparent paradox in classical statistical physics is the mechanism by which conservative, time-re...
AbstractIn this paper we study the reductions of evolutionary PDEs on the manifold of the stationary...
We consider a modification of the three-dimensional Navier-Stokes equations and other hydrodynamic...
Abstract: We consider a general class of evolution equations with nonlinear dissipation. Under minim...
This paper is devoted to the problem of finite-dimensional reduction for parabolic partial different...
We consider model order reduction of parameterized Hamiltonian systems describing nondissipative phe...
We consider model order reduction of parameterized Hamiltonian systems describing nondissipative phe...
The determining modes for the two-dimensional incompressible Navier-Stokes equations (NSE) are shown...
Abstract: In this set of lectures I will describe how one can use ideas of dynamical sys-tems theory...
We consider a Navier–Stokes–Voigt fluid model where the instantaneous kinematic viscosity has been c...
In many finite and infinite dimensional systemslow-dimensional behaviour is often observed. That is ...
First author draftThe two dimensional incompressible Navier–Stokes equation on := [0,2] × [0,2] wit...
The uniformly damped Korteweg¿de Vries (KdV) equation with periodic boundary conditions can be viewe...
We introduce here a simple finite-dimensional feedback control scheme for stabilizing solutions of i...