Zeldovich–Liñán model

Albeit, there are two fundamental aspects that differentiate Zeldovich–Liñán–Dold (ZLD) model from the Zeldovich–Liñán (ZL) model. First of all, the so-called cold-boundary difficulty in premixed flames does not occur in the ZLD model^[4] and secondly the so-called crossover temperature exist in the ZLD, but not in the ZL model.^[9]

For simplicity, consider a spatially homogeneous system, then the concentration ${\displaystyle C_{\mathrm {Z} }(t)}$  of the radical in the ZLD model evolves according to

${\displaystyle {\frac {dC_{\mathrm {Z} }}{dt}}=C_{\mathrm {Z} }\left(A_{\mathrm {I} }C_{\mathrm {F} }e^{-E_{\mathrm {I} }/RT}-A_{\mathrm {II} }\right).}$ 

It is clear from this equation that the radical concentration will grow in time if the righthand side term is positive. More preceisley, the initial equilibrium state ${\displaystyle C_{\mathrm {Z} }(0)=0}$  is unstable if the right-side term is positive. If ${\displaystyle C_{\mathrm {F} }(0)=C_{\mathrm {F} ,0}}$  denotes the initial fuel concentration, a crossover temperature ${\displaystyle T^{*}}$  as a temperature at which the branching and recombination rates are equal can be defined, i.e.,^[7]

${\displaystyle e^{E_{\mathrm {I} }/RT^{*}}={\frac {A_{\mathrm {I} }}{A_{\mathrm {II} }}}C_{\mathrm {F} ,0}.}$ 

When ${\displaystyle T>T^{*}}$ , branching dominates over recombination and therefore the radial concentration will grow in time, whereas if ${\displaystyle T<T^{*}}$ , recombination dominates over branching and therefore the radial concentration will disappear in time.

In a more general setup, where the system is non-homogeneous, evaluation of crossover temperature is complicated because of the presence of convective and diffusive transport.

In the ZL model, one would have obtained ${\displaystyle e^{E_{\mathrm {I} }/RT^{*}}=(A_{\mathrm {I} }/A_{\mathrm {II} })C_{\mathrm {F} ,0}C_{\mathrm {Z} }(0)}$ , but since ${\displaystyle C_{\mathrm {Z} }(0)}$  is zero or vanishingly small in the perturbed state, there is no crossover temperature.

In his analysis, Liñán showed that there exists three types of regimes, namely, slow recombination regime, intermediate recombination regime and fast recombination regime.^[9] These regimes exist in both aforementioned models.

Let us consider a premixed flame in the ZLD model. Based on the thermal diffusivity ${\displaystyle D_{T}}$  and the flame burning speed ${\displaystyle S_{L}}$ , one can define the flame thickness (or the thermal thickness) as ${\displaystyle \delta _{L}=D_{T}/S_{L}}$ . Since the activation energy of the branching is much greater than thermal energy, the chracteristic thickness ${\displaystyle \delta _{B}}$  of the branching layer will be ${\displaystyle \delta _{B}/\delta _{L}\sim O(1/\beta )}$ , where ${\displaystyle \beta }$  is the Zeldovich number based on ${\displaystyle E_{\mathrm {I} }}$ . The recombination reaction does not have the activation energy and its thickness ${\displaystyle \delta _{R}}$  will characterised by its Damköhler number ${\displaystyle Da_{\mathrm {II} }=(D_{T}/S_{L}^{2})/(W_{\mathrm {Z} }A_{\mathrm {II} }^{-1})}$ , where ${\displaystyle W_{\mathrm {Z} }}$  is the molecular weight of the intermediate species. Specifically, from a diffusive-reactive balance, we obtain ${\displaystyle \delta _{R}/\delta _{L}\sim O(Da_{\mathrm {II} }^{-1/2})}$  (in the ZL model, this would have been ${\displaystyle \delta _{R}/\delta _{L}\sim O(Da_{\mathrm {II} }^{-1/3})}$ ).

By comparing the thicknesses of the different layers, the three regimes are classified:^[9]

• Slow Recombination Regime (SRR): ${\displaystyle Da_{\mathrm {II} }=O(1)}$  and ${\displaystyle O(\delta _{B})\ll O(\delta _{R})=O(\delta _{L}).}$ 
• Intermediate Recombination Regime (IRR): ${\displaystyle Da_{\mathrm {II} }=O(\beta )}$  and ${\displaystyle O(\delta _{B})\ll O(\delta _{R})\ll O(\delta _{L}).}$ 
• Fast Recombination Regime (FRR): ${\displaystyle Da_{\mathrm {II} }=O(\beta ^{2})}$  and ${\displaystyle O(\delta _{B})=O(\delta _{R})\ll O(\delta _{L}).}$ 

The fast recombination represents siturations near the flammability limits. As can be seen, the recombination layer becomes comprable to the brnaching layer. The criticality is achieved when the branching is unable to cope up with the recombination. Such criticality exists in the ZLD model. Su-Ryong Lee and Jong S. Kim showed that as ${\displaystyle \Delta \equiv Da_{\mathrm {II} }/\beta ^{2}}$  becomes large, the critical condition is reached,^[9]

${\displaystyle r=e\left(1+{\frac {0.4162}{\sqrt {\Delta }}}\right)}$ 

where

${\displaystyle r={\frac {Da_{\mathrm {I} }}{\beta Da_{\mathrm {II} }}}e^{-\beta (1+q)/q},\quad Da_{\mathrm {I} }={\frac {D_{T}/S_{L}^{2}}{(A_{\mathrm {I} }Y_{\mathrm {F} ,0}/W_{\mathrm {F} })^{-1}}}.}$ 

Here ${\displaystyle q}$  is the heat release parameter, ${\displaystyle Y_{\mathrm {F} ,0}}$  is the unburnt fuel mass fraction and ${\displaystyle W_{\mathrm {F} }}$  is the molecular weight of the fuel.

• Zel'dovich mechanism
• Peters four-step chemistry