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International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Vol XXXV, Part B4. Istanbul 2004
[n this case study, taking the RMSE of 10 m, for the Upstream
site (undulating terrain), the slope uncertainty is 9? (for 20 m
cell size ) up to 22? (for 5m cell size), and for the Downstream
site (flat terrain) 11? (for 20 m cell size) up to 35? (for 5 m
resolution ).
4.3 Effects of Resolution on Slope RMSE
Slope RMSE decreases with increase of cell size following a
negative power trend (Figure 9) but less strong than expected if
all effects are due to the large number of random variables
involved.
Because in this case error is assumed to be randomly
distributed, more slope variability occurs for the surface with
smaller cell size than that with bigger cell size. The increase of
cell size to some extent brings smoothing effects and with
similar error of the elevation, the slope RMSE is lower.
40 1 mt T
| * DownlO
s Upl0
35
Slope RMSE (degree)
+ T 1 t + T - i
4 6 8 10 12 14 16 18 020. 22
Cell Size (m)
Figure 9. Effects of resolution on slope RMSE, example of
initial DEM RMSE = 10 m
4.4 Effects of Spatial-dependence
44.1 Perturbation layer - unfiltered and filtered. An
example of unfiltered layer for perturbation (Figure 10a) shows
randomly distributed error. In the filtered layers (Figure 10b and
10c), clustered values are seen, with “decreasing” values as the
function of distance. This effect is more clearly seen in the
Upstream site (Figure 10b), because the distance of spatial
dependence is bigger in this site than in Downstream site
(Figure 10c).
x a
a
= Du Te
o m
aes ve Eros
ds
Unfiltered Filtered (upstream) Filtered (downstream)
[7] -36.6- -27.2 -4.2--3 L..1:98--72
]-27.2 - -17.8 I. i73--19 fo]
28
Ri
Eu
RES
EN
s
"8.3 - 1.1
1.1- 10.5
10.5 - 19.9
19.9 - 29.4
29.4 - 38.8
(a)
Figure 10. Perturbation layer (a) unfiltered; (b) filtered for
Upstream site: (c) filtered for Downstream site
4.4.2 Effects of spatial dependence on the slope grids. The
final average slope grids by the end of simulations, both the
unfiltered and. filtered and in comparison with the original one
are shown in Figure 11. Frequency distributions are shown in
Figures 12 & 13. From the unfiltered approach, there is an
increase of low slopes into steeper slopes, which is the effect of
“added” error. With the incorporation of spatial dependence,
slopes are less eicvated and the distribution is closer to that of
the original slope grid.
Upstream original
Slope (deg ee]
(1:0
[7] 10.20
[7] 0.3
Downstream unfiltered
Downstream original
Hog
CE rtm "e Downstream filtered
Figure 11. Original slope grids and the resulting slope grids
—*— Origin |
—* - Unfilterred |
*^ Filterred
Fifonency
0 10 20 30 40 50 60
Slope (degree)
Figure 12. Frequency distribution of original slope, and slopes
of unfiltered and filtered approaches in the Upstream site
900 ,
850 | —*— Origin
800 ; —* - Unfilterred
750 F +++: Filterred
650 | A
600 |
550 |
ts
4
, A
©
dede
ve“
Lilo Un
S
Slope (degree)
Figure 13. Frequency distribution of original slope, and slopes
of unfiltered and filtered approaches in the Downstream site
Despite the different magnitude, both perturbations create a
larger frequency of steep slopes. However, the slopes of
filtered-perturbed DEM stay closer to the original slopes than
the unfiltered-perturbed ones. The shape of frequency
distribution of slopes is maintained, i.e. normal for Upstream
site and left-skewed for the Downstream one
4.4.3 Effects of spatial dependence on the slope RMSE. The
incorporation of spatial dependence, i.c. by applying weighted-
mean filter, decreases slope RMSE in the Upstream site into
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