Difference between revisions of "Rayleigh scattering"

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==== References ====
 
==== References ====
  
''Hansen'' (1974) : https://ui.adsabs.harvard.edu/link_gateway/1974SSRv...16..527H/ADS_PDF equations 2.29 to 2.32
+
''Hansen'' (1974) : https://ui.adsabs.harvard.edu/link_gateway/1974SSRv...16..527H/ADS_PDF equations (2.29) to (2.32)
  
 
Rayleigh routine in exo_k : http://perso.astrophy.u-bordeaux.fr/~jleconte/exo_k-doc/_modules/exo_k/rayleigh.html#Rayleigh.sigma_mol
 
Rayleigh routine in exo_k : http://perso.astrophy.u-bordeaux.fr/~jleconte/exo_k-doc/_modules/exo_k/rayleigh.html#Rayleigh.sigma_mol
  
 
Exo_k uses formalism from :
 
Exo_k uses formalism from :
''Caldas'' (2019) : https://hal.archives-ouvertes.fr/hal-02005332/document equation 12 & appendix D
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''Caldas'' (2019) : https://hal.archives-ouvertes.fr/hal-02005332/document equation (12) & appendix D
  
 
==== Relations between LMDZ & Exo_k formalisms ====
 
==== Relations between LMDZ & Exo_k formalisms ====

Revision as of 15:10, 28 September 2022

About Rayleigh scattering in LMDZ Generic

Formalism

References

Hansen (1974) : https://ui.adsabs.harvard.edu/link_gateway/1974SSRv...16..527H/ADS_PDF equations (2.29) to (2.32)

Rayleigh routine in exo_k : http://perso.astrophy.u-bordeaux.fr/~jleconte/exo_k-doc/_modules/exo_k/rayleigh.html#Rayleigh.sigma_mol

Exo_k uses formalism from : Caldas (2019) : https://hal.archives-ouvertes.fr/hal-02005332/document equation (12) & appendix D

Relations between LMDZ & Exo_k formalisms

In LMDZ, in optcv.F90 we have :

TRAY(K,NW) = TAURAY(NW) * DPR(K)

In exo_k we have :

TRAY \( \displaystyle = \sigma_{exok} dN \) with \( \displaystyle \sigma_{exok} \) the cross section and dN in molecules/m2

which gives : TRAY \( \displaystyle = \sigma_{exok} \frac{dm}{m_{molecule}} \) with dm in kg/m2

and then : TRAY \( \displaystyle = \frac{\sigma_{exok}}{g * m_{molecule}} dP\)

so

\( \displaystyle \text{TAURAY} = \frac{\sigma_{exok}}{g * m_{molecule}} \)


To be noticed :

TAURAY(NW) is calculated in calc_rayleigh.F90.

It is in fact TAUVAR which calculated, and then averaged by the black body function for each channel to give TAURAY \[ \text{TAURAY(NW)} = \frac{\int_{\lambda' \in \text{channel}} \text{TAUVAR} (\lambda') B_{\lambda} \, \mathrm{d}\lambda'}{\int B_{\lambda} \, \mathrm{d}\lambda'} \]