Hardy–Littlewood maximal function: Difference between revisions

Revision as of 18:07, 20 January 2014

Reynolds analogy is popularly known to relate turbulent momentum and heat transfer.^[1] The main assumption is that heat flux q/A in a turbulent system is analogous to momentum flux τ, which suggests that the ratio τ/(q/A) must be constant for all radial positions.

The complete Reynolds analogy* is:

$\frac{f}{2} = \frac{h}{C_{p} \times G} = \frac{k'_{c}}{V_{a v}}$

Experimental data for gas streams agree approximately with above equation if the Schmidt and Prandtl numbers are near 1.0 and only skin friction is present in flow past a flat plate or inside a pipe. When liquids are present and/or form drag is present, the analogy is conventionally known to be invalid.^[1]

In 2008, the qualitative form of validity of Reynolds' analogy was re-visited for laminar flow of incompressible fluid with variable dynamic viscosity (μ).^[2] It was shown that the inverse dependence of Reynolds number (Re) and skin friction coefficient(c_f) is the basis for validity of the Reynolds’ analogy, in laminar convective flows with constant & variable μ. For μ = const. it reduces to the popular form of Stanton number (St) increasing with increasing Re, whereas for variable μ it reduces to St increasing with decreasing Re. Consequently, the Chilton-Colburn analogy of St•Pr^2/3 increasing with increasing c_f is qualitatively valid whenever the Reynolds’ analogy is valid. Further, the validity of the Reynolds’ analogy is linked to the applicability of Prigogine's Theorem of Minimum Entropy Production.^[3] Thus, Reynolds' analogy is valid for flows that are close to developed, for whom, changes in the gradients of field variables (velocity & temperature) along the flow are small.^[2]

References

↑ ^1.0 ^1.1 Geankoplis, C.J. Transport processes and separation process principles (2003), Fourth Edition, p. 475.
↑ ^2.0 ^2.1 Mahulikar, S.P., & Herwig, H., 'Fluid friction in incompressible laminar convection: Reynolds' analogy revisited for variable fluid properties,' European Physical Journal B: Condensed Matter & Complex Systems, 62(1), (2008), pp. 77-86.
↑ Prigogine, I. Introduction to Thermodynamics of Irreversible Processes (1961), Interscience Publishers, New York.

[Gean-1] 1.0 ^1.1 Geankoplis, C.J. Transport processes and separation process principles (2003), Fourth Edition, p. 475.

[Mah-2] 2.0 ^2.1 Mahulikar, S.P., & Herwig, H., 'Fluid friction in incompressible laminar convection: Reynolds' analogy revisited for variable fluid properties,' European Physical Journal B: Condensed Matter & Complex Systems, 62(1), (2008), pp. 77-86.

[3] Prigogine, I. Introduction to Thermodynamics of Irreversible Processes (1961), Interscience Publishers, New York.

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[2]

[3]

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+'''Reynolds analogy''' is popularly known to relate turbulent momentum and heat transfer.<ref name=Gean>Geankoplis, C.J. ''Transport processes and separation process principles'' (2003), Fourth Edition, p. 475.</ref>  The main assumption is that heat flux q/A in a turbulent system is analogous to momentum flux τ, which suggests that the ratio τ/(q/A) must be constant for all radial positions.
+The complete Reynolds analogy* is:
+<math> \frac{f}{2} = \frac{h}{C_p\times G} = \frac{k'_c}{V_{av}} </math>
+Experimental data for gas streams agree approximately with above equation if the [[Schmidt number|Schmidt]] and [[Prandtl number|Prandtl]] numbers are near 1.0 and only [[skin friction]] is present in flow past a flat plate or inside a pipe. When liquids are present and/or  [[form drag]] is present, the analogy is conventionally known to be invalid.<ref name=Gean/>
+In 2008, the qualitative form of validity of Reynolds' analogy was re-visited for laminar flow of incompressible fluid with variable dynamic viscosity (μ).<ref name=Mah>Mahulikar, S.P., & Herwig, H., 'Fluid friction in incompressible laminar convection: Reynolds' analogy revisited for variable fluid properties,' ''European Physical Journal B: Condensed Matter & Complex Systems'', '''62(1)''', (2008), pp. 77-86.</ref>  It was shown that the inverse dependence of Reynolds number (''Re'') and skin friction coefficient(''c''<sub>f</sub>) is the basis for validity of the Reynolds’ analogy, in laminar convective flows with constant & variable μ.  For μ = const. it reduces to the popular form of Stanton number (''St'') increasing with increasing ''Re'', whereas for variable μ it reduces to ''St'' increasing with decreasing ''Re''.  Consequently, the Chilton-Colburn analogy of ''St''•''Pr''<sup>2/3</sup> increasing with increasing ''c''<sub>f</sub> is qualitatively valid whenever the
+Reynolds’ analogy is valid.  Further, the validity of the Reynolds’ analogy is linked to the applicability of Prigogine's Theorem of Minimum Entropy Production.<ref>Prigogine, I. ''Introduction to Thermodynamics of Irreversible Processes'' (1961), Interscience Publishers, New York.</ref>  Thus, Reynolds' analogy is valid for flows that are close to developed, for whom, changes in the gradients of field variables (velocity & temperature) along the flow are small.<ref name=Mah/>
+==See also==
+* [[Reynolds number]]
+* [[Chilton and Colburn J-factor analogy]]
+==References==
+<references/>
+<!-- Categories -->
+[[Category:Chemical engineering]]
+[[Category:Analogy]]

Hardy–Littlewood maximal function: Difference between revisions

Revision as of 18:07, 20 January 2014

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