Zeldovich number

The Zel'dovich number is a dimensionless number which provides a quantitative measure for the activation energy of a chemical reaction which appears in the Arrhenius exponent, named after the Russian scientist Yakov Borisovich Zel'dovich, who along with David A. Frank-Kamenetskii, first introduced in their paper in 1938.[1][2][3] In 1983 ICDERS meeting at Poitiers, it was decided to name after Zel'dovich.[4]

It is defined as

β = E a R T b T b T u T b {\displaystyle \beta ={\frac {E_{a}}{RT_{b}}}\cdot {\frac {T_{b}-T_{u}}{T_{b}}}}

where

  • E a {\displaystyle E_{a}} is the activation energy of the reaction
  • R {\displaystyle R} is the universal gas constant
  • T b {\displaystyle T_{b}} is the burnt gas temperature
  • T u {\displaystyle T_{u}} is the unburnt mixture temperature.

In terms of heat release parameter α {\displaystyle \alpha } , it is given by

β = E a R T b α {\displaystyle \beta ={\frac {E_{a}}{RT_{b}}}\alpha }

For typical combustion phenomena, the value for Zel'dovich number lies in the range β 8 20 {\displaystyle \beta \approx 8-20} . Activation energy asymptotics uses this number as the large parameter of expansion.

References

  1. ^ Williams, Forman A. "Combustion theory." (1985).
  2. ^ Linan, Amable, and Forman Arthur Williams. "Fundamental aspects of combustion." (1993).
  3. ^ Y.B. Zel’dovich and D.A. Frank-Kamenetskii, Theory of thermal propagation of flame, Zh. Fiz. Khim+. 12 (1938), pp. 100–105.
  4. ^ Clavin, P. (1985). Dynamic behavior of premixed flame fronts in laminar and turbulent flows. Progress in energy and combustion science, 11(1), 1-59.


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