Vertical natural convection: application of the unifying theory of thermal convection

TL;DR

This study demonstrates that the unifying Grossmann-Lohse theory effectively describes the boundary-layer and turbulence scaling in vertical natural convection across a wide range of Rayleigh numbers, extending its applicability beyond horizontal convection.

Contribution

The paper applies the GL theory to vertical natural convection, showing laminar and turbulent scaling behaviors and suggesting recalibration of empirical relationships for better physical accuracy.

Findings

Boundary-layer thicknesses follow laminar Prandtl-Blasius-Pohlhausen scaling.

Turbulent dissipation obeys Kolmogorov-Obukhov-Corrsin scaling.

Global buoyancy flux exhibits both laminar and turbulent scaling behaviors.

Abstract

Results from direct numerical simulations of vertical natural convection at Rayleigh numbers $1.0\times 10^5$-$1.0\times 10^9$ and Prandtl number $0.709$ support a generalised applicability of the Grossmann-Lohse (GL) theory, which was originally developed for horizontal natural (Rayleigh-B{\'e}nard) convection. In accordance with the GL theory, it is shown that the boundary-layer thicknesses of the velocity and temperature fields in vertical natural convection obey laminar-like Prandtl-Blasius-Pohlhausen scaling. Specifically, the normalised mean boundary-layer thicknesses scale with the $-1/2$-power of a wind-based Reynolds number, where the "wind" of the GL theory is interpreted as the maximum mean velocity. Away from the walls, the dissipation of the turbulent fluctuations, which can be interpreted as the "bulk" or "background" dissipation of the GL theory, is found to obey the Kolmogorov-Obukhov-Corrsin scaling for fully developed turbulence. In contrast to Rayleigh-B{\'e}nard convection, the direction of gravity in vertical natural convection is parallel to the mean flow. The orientation of this flow presents an added challenge because there no longer exists an exact relation that links the normalised global dissipations to the Nusselt, Rayleigh and Prandtl numbers. Nevertheless, we show that the unclosed term, namely the global-averaged buoyancy flux that produces the kinetic energy, also exhibits both laminar and turbulent scaling behaviours, consistent with the GL theory. The present results suggest that, similar to Rayleigh-B{\'e}nard convection, a pure power-law relationship between the Nusselt, Rayleigh and Prandtl numbers is not the best description for vertical natural convection and existing empirical relationships should be recalibrated to better reflect the underlying physics.