# Boundary layer structure in turbulent Rayleigh-B\'enard convection in a   slim box

**Authors:** Hong-Yue Zou, Wen-Feng Zhou, Xi Chen, Yun Bao, Jun Chen, and Zhen-Su, She

arXiv: 1901.07913 · 2019-10-08

## TL;DR

This study uses 3D simulations to analyze the boundary layer structure in turbulent Rayleigh-Bénard convection within a slim box, revealing new insights into temperature profiles, velocity profiles, and the effects of pressure gradients.

## Contribution

It introduces a detailed characterization of velocity and temperature profiles in a slim-box RBC setup, highlighting the role of thermal plumes and pressure gradients, with a novel stress length function for velocity.

## Key findings

- Temperature profile in plume-ejecting regions is logarithmic.
- Velocity profile fits a two-layer stress length model.
- Thermal plumes influence the temperature log-law and flow structure.

## Abstract

The logarithmic law of mean temperature profile has been observed in different regions in Rayleigh-B\'enard turbulence. However, how thermal plumes correlate to the log law of temperature and how the velocity profile changes with pressure gradient are not fully understood. Here, we performed three-dimensional simulations of Rayleigh-B\'enard turbulence in a slim-box without the front and back walls with aspect ratio, $L:D:H=1:1/6:1$, in the Rayleigh number $Ra=[1\times10^8, 1\times10^{10}]$ for Prandtl number $Pr=0.7$. The velocity profile is successfully quantified by a two-layer function of a stress length, $\ell_u^+\approx \ell_0^+(z^+)^{3/2}\left[1+\left({z^+}/{z_{sub}^+}\right)^4\right]^{1/4}$, as proposed by She et al. (She 2017), though neither a Prandtl-Blasius-Pohlhausen type nor the log-law is seen in the viscous boundary layer. In contrast, the temperature profile in the plume-ejecting region is logarithmic for all simulated cases, being attributed to the emission of thermal plumes. The coefficient of the temperature log-law, $A$ can be described by composition of the thermal stress length $\ell^*_{\theta}$ and the thicknesses of thermal boundary layer $z^*_{sub}$ and $z^*_{buf}$, i.e. $A\simeq z^*_{sub}/\left(\ell^*_{\theta 0}{z^*_{buf}}^{3/2}\right)$. The adverse pressure gradient responsible for turning the wind direction contributes to thermal plumes gathering at the ejecting region and thus the log-law of temperature profile. The Nusselt number scaling and local heat flux of the present simulations are consistent with previous results in confined cells. Therefore, the slim-box RBC is a preferable system for investigating in-box kinetic and thermal structures of turbulent convection with the large-scale circulation on a fixed plane.

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## Figures

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## References

51 references — full list in the complete paper: https://tomesphere.com/paper/1901.07913/full.md

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Source: https://tomesphere.com/paper/1901.07913