International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences, Vol XXXV, Part B4. Istanbul 2004
previous methods. This case demonstrate that in this method
samples have better distribution in image, then with less
samples can achieve appropriate results. Also there was not
overestimating tendency problem in these four study areas. This
subject also is a confirmation about efficiency of this sampling
schema in all of these images. In view of graphs of means and
standard deviations in Figure 5 this subject is delineated that in
images with large image size i.e. image #3 and image #4, means
are closer to real values (Figure 5(a)) whereas standard
deviations are appropriate (Figure 5(b) and Figure 5(c)), then it
scems that this method is more efficient in large study areas.
If results of image #3 and image #4 in Figure 5 are compared
together, it is seen that image #4 with larger field sizes has
better results ie. smaller difference of means (Figure 5(a)) and
smaller standard deviations (Figure 5(b) and Figure 5(c)), then
in addition to large image size, large object size is a factor for
achievement of good results. In the case of real image, this
matter is confirmed: this image with smaller image size than
image #3 and because of larger field size has results better than
image #3.
vverall accuracy
differenee et
Figure 5. The difference of average overall accuracies after
stability with actual overall accuracies (a) and standard
deviations from means (b), and standard deviations from real
values (c), using SYSTEM method (each sampling schema for
each sample size has been repeated 30 times and the results
have been averaged)
With comparing Figure 5(a) with same graphs in previous
methods (Figure 2(a) and Figure 4(a)), it is obvious that the
range of values in this graph is lower than the others. Then this
method is more appropriate from other methods. The results of
computing overall accuracies in real image show that the results
go towards stability after almost 50 samples for each class.
4.4 Experiment #4: Investigation of Stratified Systematic
Unaligned Sampling (SSUS) schema
In this sampling method the same result as STRAT sampling
about the stability of the means of overall accuracies was
achieved. In other words with 50 sample for each class and
without considering the size of images, the stability of results
was acquired. The reason for this matter is that SSUS method
has either random or systematic characteristics. Then results of
SSUS method not as SYSTEM method with small sample size
for all images and not as SRS method with large sample size for
large images, but with almost 50 samples for each class go
towards stability.
There is not overestimating problem in graphs of this method.
This subject is also visible in comparing of graphs in Figure 6,
because standard deviations from means (Figure 6(b)) are close
to standard deviations from real overall accuracies (Figure 6(c))
in all of images. This subject is a reason for efficiency of this
sampling schema in all of these images.
The best results have been produced in image #3 and image #4
that are images with large image size. These results are the best
because of smallness of differences from real overall accuracies
(Figure 6(a)) and standard deviations (Figure 6(b) and Figure
6(c)).
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Figure 6. The difference of average overall accuracies after
stability with actual overall accuracies (a) and standard
deviations from means (b), and standard deviations from real
values (c), using SSUS method (each sampling schema for each
sample size has been repeated 30 times and the results have
been averaged)
The results of computing of overall accuracies with various
sample sizes with stratified systematic unaligned sampling
schema for the real TM image showed that the results go
towards stability after 50 samples for each class.
4.5 Experiment#5: Investigation of Cluster Sampling (CS)
Schema
In this experiment CS schema with cluster shape 3 by 3 1s
investigated. In this sampling method in all of images the means
of overall accuracies go to stability after 60 or 70 samples for
each class. These values for sample size are the largest values in
comparing with the other methods. This case shows that in this
method samples have not suitable distribution in image then
with further samples can achieve the some better results.
In graphs of image #1 the overestimating of results are
observed. In the case of image #4 although the overestimating
tendency don't exist, this image has the maximum value of
standard deviation (Figure 7(b) and Figure 7(c)) even with
respect to graphs of the other methods. Then the results of this
image are not appropriate too. Totally neither of these images
has preferable and suitable results because if averages of
calculations (Figure 7(a)) are small value, standard deviation of
that (Figure 7(b) and Figure 7(c)) is large and vice versa. Then
this method is not a suitable sampling schema in neither of
images in this paper. The reason for this is that with cluster
sampling, the distribution of samples in images is not suitable
and the samples don’t represent the population properly.
S sigmOV
image number page number
Figure 7. The difference of average overall accuracies after
stability with actual overall accuracies (a) and standard
deviations from means (b), and standard deviations from real
values (c), using CS method (each sampling schema for each
sample size has been repeated 30 times and the results have
been averaged)
The results of the real TM image with this sampling schema |
showed that the results go towards stability after 70 samples for
each class.
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