Amplitude of quark$+$antiquark $rightarrow$ ghost$+$antighost in QCD

I was given a nice answer to this question that may be worth writing. When we act on the incoming physical state consisting of a quark-antiquark pair $left|qbar q_{mathrm{in}}right>$ with the evolution operator $S$, the Feynman rules allow for different outgoing states at lowest order : physical ones, $left|qbar q_{mathrm{out}}right>$ (quark-antiquark pair) and $left|ij_{mathrm{out}}right>$ (gluons with physical polarisations); and unphysical ones, $left|chibarchi_{mathrm{out}}right>$ (ghost-antighost pair) and $left|+-_{mathrm{out}}right>$ (gluons with unphysical polarization). We can summarize it as follows: $$Sleft|qbar q_{mathrm{in}}right> = left|qbar q_{mathrm{out}}right> oplusleft|ij_{mathrm{out}}right> oplusleft|chibarchi_{mathrm{out}}right> oplusleft|+-_{mathrm{out}}right>$$ where the $oplus$ mean that there are some coefficients in front of the terms. After doing the calculation, it turns out that the unphysical contribution can be written as the BRST charge $q_{mathrm{BRST}}$ acting on some other state: $$left|chibarchi_{mathrm{out}}right> oplusleft|+-_{mathrm{out}}right> = -frac{1}{sqrt{2|mathbf{p}|}}q_{mathrm{BRST}}left|barchi+_mathrm{out}right>$$ which means that in the end, $Sleft|qbar q_{mathrm{in}}right>$ is hopefully a physical state (that is, in the kernel of the BRST charge) thanks to the fact that $q_{BRST}^2=0$.