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Effects of Atwood and Reynolds numbers on the evolution of buoyancy-driven homogeneous variable-density turbulence

Denis Aslangil, Daniel Livescu, Arindam Banerjee

2020Journal of Fluid Mechanics33 citationsDOIOpen Access PDF

Abstract

The evolution of buoyancy-driven homogeneous variable-density turbulence (HVDT) at Atwood numbers up to 0.75 and large Reynolds numbers is studied by using high-resolution direct numerical simulations. To help understand the highly non-equilibrium nature of buoyancy-driven HVDT, the flow evolution is divided into four different regimes based on the behaviour of turbulent kinetic energy derivatives. The results show that each regime has a unique type of dependence on both Atwood and Reynolds numbers. It is found that the local statistics of the flow based on the flow composition are more sensitive to Atwood and Reynolds numbers compared to those based on the entire flow. It is also observed that, at higher Atwood numbers, different flow features reach their asymptotic Reynolds-number behaviour at different times. The energy spectrum defined based on the Favre fluctuations momentum has less large-scale contamination from viscous effects for variable-density flows with constant properties, compared to other forms used previously. The evolution of the energy spectrum highlights distinct dynamical features of the four flow regimes. Thus, the slope of the energy spectrum at intermediate to large scales evolves from , as a function of the production-to-dissipation ratio. The classical Kolmogorov spectrum emerges at intermediate to high scales at the highest Reynolds numbers examined, after the turbulence starts to decay. Finally, the similarities and differences between buoyancy-driven HVDT and the more conventional stationary turbulence are discussed and new strategies and tools for analysis are proposed.

Topics & Concepts

PhysicsTurbulenceReynolds numberHomogeneousMechanicsReynolds decompositionClassical mechanicsK-epsilon turbulence modelHomogeneous isotropic turbulenceStatistical physicsReynolds stress equation modelK-omega turbulence modelReynolds-averaged Navier–Stokes equationsTurbulence modelingHele-Shaw flowReynolds stressMixing (physics)Magnetic Reynolds numberTurbulence kinetic energyFluid Dynamics and Turbulent FlowsHydrology and Sediment Transport ProcessesAerodynamics and Acoustics in Jet Flows
Effects of Atwood and Reynolds numbers on the evolution of buoyancy-driven homogeneous variable-density turbulence | Litcius