The transition from laminar to chaotic motions in a viscous °uid °ow is in- vestigated by analyzing a seven dimensional dynamical system obtained by a truncation of the Fourier modes for the Kolmogorov °ow with drag friction. An- alytical expressions of the Hopf bifurcation curves are obtained and a sequence of period doubling bifurcations are numerically observed as the Reynolds num- ber is increased for ¯xed values of the drag parameter. An adaptive stabilization of the system trajectories to an equilibrium point or to a periodic orbit is ob- tained through a model reference approach which makes the control global. Finally, the e®ectiveness of this control strategy is numerically illustrated.
GAMBINO, G., LOMBARDO, M.C., SAMMARTINO, M. (2009). A Seven Mode Truncation of the Kolmogorov Flow with Drag: Analysis and Control. In Topics on Chaotic Systems, Selected Papers from CHAOS 2008 International Conference (pp.121-129). World Scientific Publishing Co. Pte. Ltd..
A Seven Mode Truncation of the Kolmogorov Flow with Drag: Analysis and Control
GAMBINO, Gaetana;LOMBARDO, Maria Carmela;SAMMARTINO, Marco Maria Luigi
2009-01-01
Abstract
The transition from laminar to chaotic motions in a viscous °uid °ow is in- vestigated by analyzing a seven dimensional dynamical system obtained by a truncation of the Fourier modes for the Kolmogorov °ow with drag friction. An- alytical expressions of the Hopf bifurcation curves are obtained and a sequence of period doubling bifurcations are numerically observed as the Reynolds num- ber is increased for ¯xed values of the drag parameter. An adaptive stabilization of the system trajectories to an equilibrium point or to a periodic orbit is ob- tained through a model reference approach which makes the control global. Finally, the e®ectiveness of this control strategy is numerically illustrated.File | Dimensione | Formato | |
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