Steady Rayleigh--B\'enard convection between stress-free boundaries

Abstract

Steady two-dimensional Rayleigh--B\'enard convection between stress-free isothermal boundaries is studied via numerical computations. We explore properties of steady convective rolls with aspect ratios π/54π, where is the width-to-height ratio for a pair of counter-rotating rolls, over eight orders of magnitude in the Rayleigh number, 103 Ra1011, and four orders of magnitude in the Prandtl number, 10-2 Pr102. At large Ra where steady rolls are dynamically unstable, the computed rolls display Ra → ∞ asymptotic scaling. In this regime, the Nusselt number Nu that measures heat transport scales as Ra1/3 uniformly in Pr. The prefactor of this scaling depends on and is largest at ≈ 1.9. The Reynolds number Re for large-Ra rolls scales as Pr-1 Ra2/3 with a prefactor that is largest at ≈ 4.5. All of these large-Ra features agree quantitatively with the semi-analytical asymptotic solutions constructed by Chini \& Cox (2009). Convergence of Nu and Re to their asymptotic scalings occurs more slowly when Pr is larger and when is smaller.