A SHORT METHOD TO COMPUTE NUSSELT NUMBERS IN RECTANGULAR AND ANNULAR CHANNELS WITH ANY RATIO OF CONSTANT HEAT RATE.
An analytic investigation of the thermal exchanges in channels is conducted with the prospect of building a simple method to de-termine the Nusselt number in steady, laminar or turbulent and monodimensional flow through rectangular and annular spaces with any ratio of constant and uniform heat rate. The study of the laminar case leads to explicit laws for the Nusselt number while the turbulent case is solved using a Reichardt turbulent viscosity model resulting in easy to solve one-dimensional ordinary differ-ential equation system. This differential equation system is solved using a Matlab based boundary value problems solver (bvp4c). A wide range of Reynolds, Prandtl and radius ratio is explored with the prospect of building correlation laws allowing the computing of Nusselt numbers for any radius ratio. Those correlations are in good agreement with the results obtained by W.M. Kays and E.Y. Leung in 1963 1. They conduced a similar analysis but with an experimental basis, they explored a greater range of Prandtl but only a few discreet radius ratio. The correlations are also compared with a CFD analysis made on a case extracted from the Réacteur Jules Horowitz.
Alexandre Malon Thierry Muller
AREVA NP -Technical Center France Fluid and Structure Mechanics department Fluid an Heat Transfers subsection Le Creusot, France
国际会议
18th International Conference on Nuclear Engineering(第18届国际核能工程大会 ICONE 18)
西安
英文
1-9
2010-05-17(万方平台首次上网日期,不代表论文的发表时间)