Transient and steady convection in two dimensions
Abstract
We simulate thermal convection in a two-dimensional square box using the no-slip condition on all boundaries, and isothermal bottom and top walls and adiabatic sidewalls. We choose 0.1 and 1 for the Prandtl number Pr and vary the Rayleigh number Ra between 106 and 1012. We particularly study the temporal evolution of integral transport quantities towards their steady states. Perhaps not surprisingly, the velocity field evolves more slowly than the thermal field, and its steady state -- which is nominal in the sense that large-amplitude low-frequency oscillations persist around plausible averages -- is reached exponentially. We study these oscillation characteristics. The transient time for the velocity field to achieve its nominal steady state increases almost linearly with the Reynolds number. For large Ra, the Reynolds number itself scales almost as Ra2/3 Pr-1, and the Nusselt number as Ra2/7.
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