11.6: Curve of Growth for Voigt Profiles
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Our next task is to construct curves of growth for Voigt profiles for different values of the ratio of the lorentzian and gaussian HWHMs, \(l/g\), which is
\[\tag{11.6.1}\label{11.6.1}\frac{l}{g}=\frac{\Gamma \lambda_0}{4\pi V_\text{m}\sqrt{\ln 2}}=\frac{\Gamma \lambda_0}{V_\text{m}\pi \sqrt{\ln 65536}}=\frac{\Gamma \lambda_0}{34.841V_\text{m}},\]
or, better, for different values of the gaussian ratio \(k_G =\frac{g}{l+g}\). These should look intermediate in appearance between figures XI.3 and 5.
The expression for the equivalent width in wavelength units is given by Equation 11.3.4:
\[\tag{11.3.4}\label{11.3.4}W=2\int_0^\infty \left [ 1-\text{exp}\left \{ -\tau(x)\right \}\right ]\,dx.\]
combined with Equation 10.5.20
\[\tag{10.5.20}\label{10.5.20}\tau (x) = Cl \tau (0)\int_{-\infty}^\infty \frac{\text{exp}\left [ -(ξ-x)^2\ln 2/g^2\right ]}{ξ^2+l^2}\,dξ.\]
That is:
\[\tag{11.6.2}\label{11.6.2}W=2\int_0^\infty \left ( 1-\text{exp} \left \{ -Cl\tau(0)\int_{-\infty}^\infty \frac{\text{exp}\left [ -(ξ-x)^2\ln 2/g^2 \right ]}{ξ^2+l^2}dξ\right \}\right )\,dx.\]
Here
- \(x = \lambda − \lambda_0\), \(l\) is the Lorentzian \(\text{HWHM} = \lambda_0^2\Gamma/(4\pi c)\) (where \(\Gamma\) may include a pressure-broadening contribution),
- \(g\) is the gaussian \(\text{HWHM} = V_\text{m}\lambda_0\sqrt{\ln 2} / c\) (where \(V_\text{m}\) may include a microturbulence contribution), and
- \(W\) is the equivalent width, all of dimension \(L\).
The symbol \(ξ\), also of dimension L, is a dummy variable, which disappears after the definite integration. \(\tau(0)\) is the optical thickness at the line centre. \(C\) is a dimensionless number given by Equation 10.5.23 and tabulated as a function of gaussian fraction in Chapter 10. The reader is urged to check the dimensions of Equation \ref{11.6.2} carefully. The integration of Equation \ref{11.6.2} is discussed in Appendix A.
Our aim is to calculate the equivalent width as a function of \(\tau(0)\) for different values of the gaussian fraction \(k_G = g/(l + g)\). What we find is as follows. Let \(W^\prime = W \sqrt{\ln 2 }/g\); that is, \(W^\prime\) is the equivalent width expressed in units of \(g /\sqrt{ \ln 2}\). For \(\tau(0)\) less than about 5, where the wings contribute relatively little to the equivalent width, we find that \(W^\prime\) is almost independent of the gaussian fraction. The difference in behaviour of the curve of growth for different profiles appears only for large values of \(\tau (0)\), when the wings assume a larger role. However, for any profile which is less gaussian than about \(k_G\) equal to about 0.9, the behaviour of the curve of growth (for \(\tau(0) > 5\)) mimics that for a lorentzian profile. For that reason I have drawn curves of growth in figure XI.6 only for \(k_G = 0.9, 0.99, 0.999\text{ and }1\). This corresponds to \(l/g = 0.1111, 0.0101, 0.0010\text{ and }0\), or to \(\Gamma \lambda_0 /V_m = 1.162, 0.1057, 0.0105\text{ and }0\) respectively.
\(\text{FIGURE XI.6}\)