Add to ORKGThe transition from laminar to chaotic motion in a viscous fluid flow is investigated by analyzing a seven dimensional dynamical system obtained by a truncation of the Fourier modes for the Kolmogorov flow with drag friction. Analytical expressions of the bifurcation curves are obtained and a sequence of period doubling bifurcations are numerically observed as the Reynoplds number is increased for fixed values of the drag parameter. An adaptive stabilization of the system trajectories to an equilibrium point or to a periodic orbit is obtained through a model reference approach which makes the control global
A two dimensional flow governed by the incompressible Navier-Stokes equations with a steady spatiall...
Originally published in Journal of Fluid Mechanics Vol 321. Cambridge University Press holds all cop...
Chaotic behavior of a Galerkin model of the Kolmogorov fluid motion equations is demonstrated. The s...
The transition from laminar to chaotic motion in a viscous fluid flow is investigated by analyzing a...
The transition from laminar to chaotic motions in a viscous fluid flow is in-vestigated by analyzing...
The transition from laminar to chaotic motions in a viscous \ub0uid \ub0ow is in- vestigated by anal...
We study a seven dimensional nonlinear dynamical system obtained by a truncation of the Navier–Stoke...
The symmetries, dynamics, and control problem of the two-dimensional (2D) Kolmogorov flow are addres...
We study a weakly stratified Kolmogorov flow under the effect of a small linear drag. We perform a l...
This paper is devoted to the control problem of a nonlinear dynamical system obtained by a truncatio...
To provide a mathematical description of the chaotic behaviour in a fluid flow, a coupled system of ...
In this thesis direct numerical simulations are used to investigate two phenomenain shear flows: lam...
On the basis of rigorous analysis supported by numerical computation, a systematic study is presente...
We study the Kolmogorov flow with weak stratification. We consider a stabilizing uniform temperature...
Abstract: We consider the Kolmogorov problem of viscous incompressible planar fluid flow u...
A two dimensional flow governed by the incompressible Navier-Stokes equations with a steady spatiall...
Originally published in Journal of Fluid Mechanics Vol 321. Cambridge University Press holds all cop...
Chaotic behavior of a Galerkin model of the Kolmogorov fluid motion equations is demonstrated. The s...
The transition from laminar to chaotic motion in a viscous fluid flow is investigated by analyzing a...
The transition from laminar to chaotic motions in a viscous fluid flow is in-vestigated by analyzing...
The transition from laminar to chaotic motions in a viscous \ub0uid \ub0ow is in- vestigated by anal...
We study a seven dimensional nonlinear dynamical system obtained by a truncation of the Navier–Stoke...
The symmetries, dynamics, and control problem of the two-dimensional (2D) Kolmogorov flow are addres...
We study a weakly stratified Kolmogorov flow under the effect of a small linear drag. We perform a l...
This paper is devoted to the control problem of a nonlinear dynamical system obtained by a truncatio...
To provide a mathematical description of the chaotic behaviour in a fluid flow, a coupled system of ...
In this thesis direct numerical simulations are used to investigate two phenomenain shear flows: lam...
On the basis of rigorous analysis supported by numerical computation, a systematic study is presente...
We study the Kolmogorov flow with weak stratification. We consider a stabilizing uniform temperature...
Abstract: We consider the Kolmogorov problem of viscous incompressible planar fluid flow u...
A two dimensional flow governed by the incompressible Navier-Stokes equations with a steady spatiall...
Originally published in Journal of Fluid Mechanics Vol 321. Cambridge University Press holds all cop...
Chaotic behavior of a Galerkin model of the Kolmogorov fluid motion equations is demonstrated. The s...