Clavin–Garcia equation

Clavin–Garcia equation or Clavin–Garcia dispersion relation provides the relation between the growth rate and the wave number of the perturbation superposed on a planar premixed flame, named after Paul Clavin and Pedro Luis Garcia Ybarra, who derived the dispersion relation in 1983. The dispersion relation accounts for Darrieus–Landau instability, Rayleigh–Taylor instability and diffusive–thermal instability and also accounts for the temperature dependence of transport coefficients.

Dispersion relation
Let $$k$$ and $$\sigma$$ be the wavenumber (measured in units of planar laminar flame thickness $$\delta_L$$) and the growth rate (measured in units of the residence time $$\delta_L^2/D_{T,u}$$ of the planar laminar flame) of the perturbations to the planar premixed flame. Then the Clavin–Garcia dispersion relation is given by


 * $$a(k)\sigma^2 + b(k) \sigma + c(k)=0$$

where


 * $$\begin{align}

a(k) &= \frac{r+1}{r} + \frac{r-1}{r} k \left(\mathcal{M} - \frac{r}{r-1}\mathcal{J}\right),\\ b(k) &= 2k + 2rk^2 (\mathcal{M}-\mathcal{J}),\\ c(k) &= - \frac{r-1}{r} Ra \, k - (r-1) k^2\left[1 -\frac{Ra}{r} \left(\mathcal{M}- \frac{r}{r-1}\mathcal{J}\right)\right] + (r-1) k^3 \left[L + \frac{3r-1}{r-1}\mathcal{M} - \frac{2r}{r-1}\mathcal{J} + (2Pr-1) \mathcal H\right], \end{align}$$

and


 * $$\mathcal{J} = \int_1^{r} \frac{\lambda(\theta)}{\theta}d\theta, \quad \mathcal H = \frac{1}{r-1}\int_{1}^{r} [L -\lambda(\theta)]d\theta.$$

Here

The function $$\lambda(\theta)$$, in most cases, is simply given by $$\lambda =\theta^m$$, where $$m=0.7$$, in which case, we have $$L=r^m$$,


 * $$\mathcal{J} = \frac{1}{m} (r^m-1), \quad \mathcal H = r^m - \frac{r^{1+m}-1}{(1+m)(r-1)}.$$

In the constant transport coefficient assumption, $$\lambda=1$$, in which case, we have


 * $$\mathcal{J} =\ln r, \quad \mathcal H = 0.$$