Macroscopic Modelling of Turbulent Flows

Inhaltsverzeichnis

• Homogenization and visco-elasticity of turbulence.
• Sedimentation of a random dilute suspension.
• Remarks on oscillations and Stokes' equation.
• Large and small structures in the computation of transition to fully developed turbulent flows.
• Eddy viscosity subgrid scale models for homogeneous turbulence.
• Blow-up in the Navier-Stokes and Euler equations.
• Large eddy simulations of turbulence in physical space analysis of spectral energy transfer.
• Vortex stability and inertial-range cascades.
• A stochastic subgrid model for sheared turbulence.
• Some challenges for modelling of turbulence and internal waves in stably stratified fluids.
• Numerical simulation of homogeneous turbulence.
• Time-dependent rayleigh-benard convection in low prandtl number fluids.
• Spectral closures to derive a subgrid scale modeling for large eddy simulations.
• Modelling of three-dimensional shock wave turbulent boundary layer interactions.
• Numerical and theoretical study of different flow regimes occurring in horizontal fluid layers, differentially heated.
• Rotating turbulence evolving freely from an initial quasi 2D state.
• Quasi-geostrophic turbulence and the mesoscale variability.
• Small-scale atmospheric turbulence and its interaction with larger-scale flows.
• Self-turbulizing flame fronts.
• Simulation as an aid to phenomenological modeling.
• Weak limits of semilinear hyperbolic systems with oscillating data.
• Large scale oscillatory instability for systems with translational and galilean invariances.
• The Kuramoto-Sivashinsky equation : A caricature of hydrodynamic turbulence ?.
• Computation of a dimension for a model of fury developed turbulence.
• Pattern formation by particles settling in viscous flows.
• Liapounov exponents for the Kuramoto-Sivashinsky model.
• Vortices and vortex-couples in two-dimensional turbulence long-lived couples are batchelor's couples.
• Numerical simulation of decaying two-dimensional turbulence: Comparison between general periodic and Taylor-Green like flows.