G equation

In Combustion, G equation is a scalar ${\displaystyle G(\mathbf {x} ,t)}$ field equation which describes the instantaneous flame position, introduced by Forman A. Williams in 1985^[1][2] in the study of premixed turbulent combustion. The equation is derived based on the Level-set method. The equation was first studied by George H. Markstein, in a restrictive form for the burning velocity.^[3][4][5]

Mathematical description

The G equation reads as^[6][7]

${\displaystyle {\frac {\partial G}{\partial t}}+\mathbf {v} \cdot \nabla G=S_{T}|\nabla G|}$ 

where

• ${\displaystyle \mathbf {v} }$  is the flow velocity field
• ${\displaystyle S_{T}}$  is the local burning velocity

The flame location is given by ${\displaystyle G(\mathbf {x} ,t)=G_{o}}$  which can be defined arbitrarily such that ${\displaystyle G(\mathbf {x} ,t)>G_{o}}$  is the region of burnt gas and ${\displaystyle G(\mathbf {x} ,t)<G_{o}}$  is the region of unburnt gas. The normal vector to the flame is ${\displaystyle \mathbf {n} =-\nabla G/|\nabla G|}$ .

Local burning velocity

According to Matalon–Matkowsky–Clavin–Joulin theory, the burning velocity of the stretched flame, for small curvature and small strain, is given by

${\displaystyle {\frac {S_{T}}{S_{L}}}=1+{\mathcal {M}}_{c}\delta _{L}\nabla \cdot \mathbf {n} +{\mathcal {M}}_{s}\tau _{L}\mathbf {n} \cdot \nabla \mathbf {v} \cdot \mathbf {n} }$ 

where

• ${\displaystyle S_{L}}$  is the burning velocity of unstretched flame
• ${\displaystyle {\mathcal {M}}_{c}}$  and ${\displaystyle {\mathcal {M}}_{s}}$  are the two Markstein numbers, associated with the curvature term ${\displaystyle \nabla \cdot \mathbf {n} }$  and the term ${\displaystyle \mathbf {n} \cdot \nabla \mathbf {v} \cdot \mathbf {n} }$  corresponding to flow strain imposed on the flame
• ${\displaystyle \delta _{L}}$  are the laminar burning speed and thickness of a planar flame
• ${\displaystyle \tau _{L}=D_{T,u}/S_{L}^{2}}$  is the planar flame residence time with ${\displaystyle D_{T,u}}$  representing the thermal diffusivity in the unburnt gas mixture.

A simple example - Slot burner

The G equation has an exact expression for a simple slot burner. Consider a two-dimensional planar slot burner of slot width ${\displaystyle b}$ . The premixed reactant mixture is fed through the slot from the bottom with a constant velocity ${\displaystyle \mathbf {v} =(0,U)}$ , where the coordinate ${\displaystyle (x,y)}$  is chosen such that ${\displaystyle x=0}$  lies at the center of the slot and ${\displaystyle y=0}$  lies at the location of the mouth of the slot. When the mixture is ignited, a premixed flame develops from the mouth of the slot to a certain height ${\displaystyle y=L}$  in the form of a two-dimensional wedge shape with a wedge angle ${\displaystyle \alpha }$ . For simplicity, let us assume ${\displaystyle S_{T}=S_{L}}$ , which is a good approximation except near the wedge corner where curvature effects will becomes important. In the steady case, the G equation reduces to

${\displaystyle U{\frac {\partial G}{\partial y}}=S_{L}{\sqrt {\left({\frac {\partial G}{\partial x}}\right)^{2}+\left({\frac {\partial G}{\partial y}}\right)^{2}}}}$ 

If a separation of the form ${\displaystyle G(x,y)=y+f(x)}$  is introduced, then the equation becomes

${\displaystyle U=S_{L}{\sqrt {1+\left({\frac {\partial f}{\partial x}}\right)^{2}}},\quad \Rightarrow \quad {\frac {\partial f}{\partial x}}={\frac {\sqrt {U^{2}-S_{L}^{2}}}{S_{L}}}}$ 

which upon integration gives

${\displaystyle f(x)={\frac {\left(U^{2}-S_{L}^{2}\right)^{1/2}}{S_{L}}}|x|+C,\quad \Rightarrow \quad G(x,y)={\frac {\left(U^{2}-S_{L}^{2}\right)^{1/2}}{S_{L}}}|x|+y+C}$ 

Without loss of generality choose the flame location to be at ${\displaystyle G(x,y)=G_{o}=0}$ . Since the flame is attached to the mouth of the slot ${\displaystyle |x|=b/2,\ y=0}$ , the boundary condition is ${\displaystyle G(b/2,0)=0}$ , which can be used to evaluate the constant ${\displaystyle C}$ . Thus the scalar field is

${\displaystyle G(x,y)={\frac {\left(U^{2}-S_{L}^{2}\right)^{1/2}}{S_{L}}}\left(|x|-{\frac {b}{2}}\right)+y}$ 

At the flame tip, we have ${\displaystyle x=0,\ y=L,\ G=0}$ , which enable us to determine the flame height

${\displaystyle L={\frac {b\left(U^{2}-S_{L}^{2}\right)^{1/2}}{2S_{L}}}}$ 

and the flame angle ${\displaystyle \alpha }$ ,

${\displaystyle \tan \alpha ={\frac {b/2}{L}}={\frac {S_{T}}{\left(U^{2}-S_{L}^{2}\right)^{1/2}}}}$ 

Using the trigonometric identity ${\displaystyle \tan ^{2}\alpha =\sin ^{2}\alpha /\left(1-\sin ^{2}\alpha \right)}$ , we have

${\displaystyle \sin \alpha ={\frac {S_{L}}{U}}.}$ 

In fact, the above formula is often used to determine the planar burning speed ${\displaystyle S_{L}}$ , by measuring the wedge angle.

References

1. Williams, F. A. (1985). Turbulent combustion. In The mathematics of combustion (pp. 97-131). Society for Industrial and Applied Mathematics.
2. Kerstein, Alan R., William T. Ashurst, and Forman A. Williams. "Field equation for interface propagation in an unsteady homogeneous flow field." Physical Review A 37.7 (1988): 2728.
3. GH Markstein. (1951). Interaction of flow pulsations and flame propagation. Journal of the Aeronautical Sciences, 18(6), 428-429.
4. Markstein, G. H. (Ed.). (2014). Nonsteady flame propagation: AGARDograph (Vol. 75). Elsevier.
5. Markstein, G. H., & Squire, W. (1955). On the stability of a plane flame front in oscillating flow. The Journal of the Acoustical Society of America, 27(3), 416-424.
6. Peters, Norbert. Turbulent combustion. Cambridge university press, 2000.
7. Williams, Forman A. "Combustion theory." (1985).