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Patterns in chaotically mixing fluid flows
Antragsteller
Professor Dr. Arkady Pikovsky
Fachliche Zuordnung
Statistische Physik, Nichtlineare Dynamik, Komplexe Systeme, Weiche und fluide Materie, Biologische Physik
Förderung
Förderung von 2003 bis 2006
Projektkennung
Deutsche Forschungsgemeinschaft (DFG) - Projektnummer 5416273
The goal of this project is the investigation of patterns which appear in mixing, temporally regular flows. The following basic questions will be addressed with numerical and analytical methods: evolution of patterns of passively advected particles; patterns for reacting chaotically advected species; the influence of the effects related to the finite size of particles on the patterns; the effect of compressibility. The main idea is to use an approach based on finding leading linear modes of the linear diffusion-advection equation for a passive scalar, either in continuous or in discrete time. These modes will be then used for stability analysis of active nonlinear problems and for construction of nonlinear structures. On all stages a connection to the Lagraingian dynamics of particles in the flow will be followed, including the cases of inertia and Basset forces acting on finite size particles. Possible application of the theory lies in the construction of effectively mixing microfluidic configurations.
DFG-Verfahren
Sachbeihilfen
Beteiligte Person
Privatdozent Dr. Markus Abel