623
NDVI
polarised reflectance increases in the forward
direction up to 0.019 for a zenith viewing angle
of 51°. Larger polarised reflectances are
observed at the corners of the matrix (in the
forward hemisphere) which correspond to
larger viewing angles. We note that the
polarised reflectance is symmetric with respect
to the principal plane, as expected.
Similar figures are obtained for wavelength
865 nm. From measurements such as those
shown in Fig. 3, one can extract the polarised
reflectance angular signature. These are
discussed below.
In the single scattering approximation, the
polarised reflectance generated in the
atmosphere writes:
D = T M°0 ( 4 )
P 4 cos^ ) cos(0 v )
where x is the atmospheric optical thickness, a
is the scattering angle, and Pp is the polarised
phase function. We note that the polarisation
model for the bare soil has a similar form.
Thus, p P cos(0 s ) cos(0 v ) depends mostly
on the scattering angle. Moreover, we have
seen in the previous section that the surface
polarised reflectance is larger for a bare soil
than for a vegetated area. We verify this
theory on the airborne measurements at 865
nm. A normalised polarised reflectance is
defined as the product of p P and
cos 0 S cos 0 V . This is done for each pixel of
the CCD matrix. For each bin of phase angle
and NDVI (calculated from the measurements
at 670 and 865 nm), we then averaged the
normalised polarised reflectance. In Fig. 4, we
plot the results expressed as isolines.
Fig. 4 confirms that the phase angle (or
scattering angle, or incidence angle) is the
main driver of the polarised reflectance. It is
close to 0 for backscattering (0° phase angle)
and increases up to about 0.5 for the largest
phase angle (around 80°). For phase angles
lower than 30° (incidence angle lower than
15°), both surface models indicate a small
polarisation (eq. 2 and 3) and no signal from
the surface is evidenced in Fig. 4. As the phase
angle increases, so does the difference between
the polarisation of vegetation and bare soil.
For large phase angles, the measurement
decreases as the NDVI increases. Thus, we
verify on airborne measurements that bare
soils (low NDVI) generate more polarised
radiance than vegetation (large NDVI) do. The
difference in normalised polarised reflectance
is on the order of 0.15 between low NDVI and
high NDVI targets in the field of. view.
0 0.25 0.5
Fi gure 4 : Normalised polarised reflectance (see
text for explanation) at 865 nm as a function
of NDVI and phase angle. The reflectance
is in %.
Fig. 5 shows the polarised reflectance, in the
principal plane, for 450 and 865 nm (symbols)
measured by airborne POLDER. We selected
this plane since it shows the largest dynamic.
Fig. 5 measurements have been acquired
during a clear day (aerosol optical thickness of
0.26 at 550 nm). Similarly, Fig. 6 shows the
measurements acquired during a hazy day
(T55o=0.76). Note that, although the two
figures are not registered (they were not
acquired over exactly the same surface), they
are representative of the measurements,
because those show little variability within a
given flight.
As expected, the polarised reflectance is
larger at 450 nm than at 865. This results from
the large increase in polarised reflectance
generated by Rayleigh scattering for shorter
wavelengths. At 450 nm, the measurements
are comparable to what is expected for a clear
atmosphere. On the other hand, at 865 nm, the
measurements (open diamonds) are much
larger than for molecular scattering (lower
thick line). Thus, at this wavelength, we must
consider the polarised reflectance generated by
the surface, and that resulting from aerosol
scattering.
Polarised reflectance generated by the
surface lies between the two dashed lines
(models of eq. 2 and 3) depending on the
