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Universal scaling of temperature variance in Rayleigh–Bénard convection near the transition to the ultimate state

Xiaozhou He, Eberhard Bodenschatz, Guenter Ahlers

2021Journal of Fluid Mechanics13 citationsDOIOpen Access PDF

Abstract

We report measurements of the temperature frequency spectra $P(\,f, z, r)$ , the variance $\sigma ^2(z,r)$ and the Nusselt number $Nu$ in turbulent Rayleigh–Bénard convection (RBC) over the Rayleigh number range $4\times 10^{11} \underset{\smash{\scriptscriptstyle\thicksim}} { &lt; } Ra \underset{\smash{\scriptscriptstyle\thicksim}} { &lt; } 5\times 10^{15}$ and for a Prandtl number $Pr \simeq ~0.8$ ( $z$ is the vertical distance from the bottom plate and $r$ is the radial position). Three RBC samples with diameter $D = 1.12$ m yet different aspect ratios $\varGamma \equiv D/L = 1.00$ , $0.50$ and $0.33$ ( $L$ is the sample height) were used. In each sample, the results for $\sigma ^2/\varDelta ^2$ ( $\varDelta$ is the applied temperature difference) in the classical state over the range $0.018 \underset{\smash{\scriptscriptstyle\thicksim}} { &lt; } z/L \underset{\smash{\scriptscriptstyle\thicksim}} { &lt; } 0.5$ can be collapsed onto a single curve, independent of $Ra$ , by normalizing the distance $z$ by the thermal boundary layer thickness $\lambda = L/(2 Nu)$ . One can derive the equation $\sigma ^2/\varDelta ^2 = c_1\times \ln (z/\lambda )+c_2+c_3(z/\lambda )^{-0.5}$ from the observed $f^{-1}$ scaling of the temperature frequency spectrum. It fits the collapsed $\sigma ^2(z/\lambda )$ data in the classical state over the large range $20 \underset{\smash{\scriptscriptstyle\thicksim}} { &lt; } z/\lambda \underset{\smash{\scriptscriptstyle\thicksim}} { &lt; } 10^4$ . In the ultimate state ( $Ra \underset{\smash{\scriptscriptstyle\thicksim}} { &gt; } Ra^*_2$ ) the data can be collapsed only when an adjustable parameter $\tilde \lambda = L/(2 \widetilde {Nu})$ is used to replace $\lambda$ . The values of $\widetilde {Nu}$ are larger by about 10 % than the experimentally measured $Nu$ but follow the predicted $Ra$ dependence of $Nu$ for the ultimate RBC regime. The data for both the global heat transport and the local temperature fluctuations reveal the ultimate-state transitions at <jats:tex-ma

Topics & Concepts

PhysicsLambdaNusselt numberScalingPrandtl numberCombinatoricsMathematical physicsGeometryMathematicsConvectionTurbulenceThermodynamicsQuantum mechanicsReynolds numberFluid Dynamics and Turbulent FlowsWind and Air Flow StudiesPlant Water Relations and Carbon Dynamics