Delta Electronics SS1-UM-1.05 Manual

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SunScan User Manual v 1.05 LAI theory •

••

• 57

The next section derives the transmission of light from a uniform overcast sky

through a uniform infinite canopy of black leaves of constant LAI with an ellipsoidal

leaf angle distribution.

Let the sky have uniform brightness of 1 per steradian over the hemisphere.

The radiance of a strip around the sky at angle θ is given by:

R

...

2

π

sin( )

θ

d

θ

and the irradiance on a horizontal surface due to that strip is given by

I

0

....

2

π

sin( )

θ

cos( )

θ

d

θ

The total irradiance due to the hemisphere is obtained by integrating over the

complete sky area:

=d

0

π

2

θ

...

2

π

sin( )

θ

cos( )

θ

1

π

For each strip of sky, the transmitted radiation is given by

I

.

I

0

exp( )

.

KL

where K is the extinction coefficient from Campbell,

so the total transmitted radiation is

I d

0

π

2

θ

....

2

π

sin( )

θ

cos( )

θ

exp( )

.

K( ),x

θ

L

and the transmission fraction τ is given by I/I

0

τ

diff

(),xL

.

1

π

d

0

π

2

θ

....

2

π

sin( )

θ

cos( )

θ

exp( )

.

K( ),x

θ

L

This integral was evaluated numerically over the range x = 0 to 1000 and L = 0 to

10, and is graphed below for three different values of

x.