mixing and segregation in two-phase flows
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Mixing and segregation in two-phase flows. Gregory Falkovich Weizmann Institute of Science, Israel. Turbulent Mixing and Beyond, ICTP 2007. Mixing versus segregation in terms of an infinitesimal element. Lyapunov exponents. → singular (fractal) SRB Measure. entropy. - PowerPoint PPT PresentationTRANSCRIPT
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Mixing and segregation in two-phase flows
Gregory FalkovichWeizmann Institute of Science, Israel
Turbulent Mixing and Beyond, ICTP 2007
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Mixing versus segregation in terms of an infinitesimal element.Lyapunov exponents.
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entropy
→ singular (fractal) SRB Measure
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Density in random compressible flows
Analogy: statistical distribution in phase
spaces (Sinai-Ruelle-Bowen measures)
Balkovsky, Fouxon, GF, Gawedzki, Bec, Horvai
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An anomalous scaling corresponds to slower divergence of particles to get more weight.Statistical integrals of motion (zero modes) of the backward-in-time evolution compensate the increase in the distances by the mass decrease inside the volume.
Coarse-grained density
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uv
Inertial particles
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Spatially smooth flow
Stokes number
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Equivalent in 1d to Anderson localization :localization length = Lyapunov exponent
One-dimensional model
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Super-symmetry broken
Lyapunov exponent
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DNS, Bec et al
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Fouxon, Stepanov, GF
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Falkovich, Lukaschuk, Denissenko, Nature 2005
n-2
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1. To understand relations between the Lagrangian and Eulerian descriptions.
2. To sort out two contributions into different quantities: i) from a smooth dynamics and multi-fractal spatial distribution, and ii) from explosive dynamics and caustics.
3. Find how collision rate and density statistics depend on the dimensionless parameters (Reynolds, Stokes and Froude numbers).
Main open problems