Compressible turbulent convection at very high Rayleigh numbers
Abstract
Heat transport in highly turbulent convection is not well understood. In this paper, we simulate compressible convection in a box of aspect ratio 4 using computationally-efficient MacCormack-TVD finite difference method on single and multi-GPUs, and reach very high Rayleigh number (Ra) -- 1015 in two dimensions and 1011 in three dimensions. We show that the Nusselt number Nu Ra0.3 (classical scaling) that differs strongly from the ultimate-regime scaling, which is Nu Ra1/2. The bulk temperature drops adiabatically along the vertical even for high Ra, which is in contrast to the constant bulk temperature in Rayleigh-B\'enard convection (RBC). Unlike RBC, the density decreases with height. In addition, the vertical pressure-gradient (-dp/dz) nearly matches the buoyancy term ( g). But, the difference, -dp/dz- g, is equal to the nonlinear term that leads to Reynolds number Re Ra1/2.
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