Penetrative Convection at High Rayleigh Numbers

Abstract

We study penetrative convection of a fluid confined between two horizontal plates, the temperatures of which are such that a temperature of maximum density lies between them. The range of Rayleigh numbers studied is Ra = [106, 108 ] and the Prandtl numbers are Pr = 1 and 11.6. An evolution equation for the growth of the convecting region is obtained through an integral energy balance. We identify a new non-dimensional parameter, , which is the ratio of temperature difference between the stable and unstable regions of the flow; larger values of denote increased stability of the upper stable layer. We study the effects of on the flow field using well-resolved lattice Boltzmann simulations, and show that the characteristics of the flow depend sensitively upon it. For the range = [0.01, 4], we find that for a fixed Ra the Nusselt number, Nu, increases with decreasing . We also investigate the effects of on the vertical variation of convective heat flux and the Brunt-V\"ais\"al\"a frequency. Our results clearly indicate that in the limit → 0 the problem reduces to that of the classical Rayleigh-B\'enard convection.