ISSN:
1573-8507
Source:
Springer Online Journal Archives 1860-2000
Topics:
Mechanical Engineering, Materials Science, Production Engineering, Mining and Metallurgy, Traffic Engineering, Precision Mechanics
,
Physics
Notes:
Abstract The approximate formula K ∩ a−2R(N−1), where a is a constant near 9 and R and N are the Rayleigh and Nusselt numbers, was proposed in [1] for the dimensionless kinetic energy K of convection in a horizontal layer of liquid. It is shown in the present paper that this expression is exact in linear and weakly nonlinear convection theory when the velocity and temperature fields are represented analytically [2–4]. The valuea is found to be 8.76 when the upper and lower boundaries of the layer are solid walls. The results are given of numerical calculations of the kinetic energy of the convection and the heat transfer in a wide range of Rayleigh numbers (up to 44 000) and Prandtl numbers (0.025 ⩽ P ⩽ 15). Analysis of the results shows that a is in fact a weak function of both R and P. If this is also the case at large R, it indicates a certain breaking of scaling of the mean convection characteristics at sufficiently large values of the Rayleigh number. It also indicates why laboratory experiments give values of n in the dependence N ∼ Rn which are generally slightly less than the theoretical value n = 1/3.
Type of Medium:
Electronic Resource
URL:
http://dx.doi.org/10.1007/BF01089572
