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Purdue ME606: Emission and In-scattering (Lecture-11)

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Emission and In- Scattering

Emission

(dIη)em = χηIbηds

Ex.

Consider a non-scattering layer that absorbs and emits

Find

dIη = κη(IbηIη)ds

Integrate:

I_\eta (s) = I_\eta (o)e^{ - \chi _\eta s} + I_\eta (1 - e^{ - \kappa _\eta s} )

In Scattering

Radiation impinging on dA from dW

I_\eta (\hat s)dA(\hat s_i \cdot s)dw_i = E_{\eta i}

This energy travel through a distance

\frac{{ds}}{{\hat s_i \cdot s}}

with in a volume d\forall = dsdA

Therefore, the total energy scattered away from \hat s_i

\sigma _\eta E_{\eta i} \frac{{ds}}{{\hat s_i \cdot s}} = \sigma _\eta I_\eta (\hat s_i )dAdw_i ds

Of this, how much is scattered into direction \hat s_i?

\sigma _\eta I_\eta (\hat s_i )dAdw_i ds = \frac{{\phi _n (s_i ,\hat s)}}{{4\pi }}

where \phi _\eta \left( {\hat s_i ,\hat s} \right)is the scattering phase function

We then integrate overall incoming direction to find

dI_\eta = ds\frac{{\sigma _\eta }}{{4\pi }}\int\limits_{4\pi } {I_\eta (\hat s_i )\phi _\eta \left( {\hat s_i ,\hat s} \right)dw_i }

Note that energy conservation requires

frac{1}{{4\pi }}\int\limits_{4\pi } {\phi _\eta \left( {\hat s_i ,\hat s} \right)dw_i }

Last modified on 12 Oct, 2008