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The International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences. Vol. XXXVII. Part B3b. Beijing 2008
pixel displacement. In principle, this way is not measuring the
main resolution. But to make a procedure tractable, resolution is
measured without considering the effects of other parameters.
The geometric error, a positional error in correspondents, is
calculated by making a grid over the whole image area for both
images. This grid is transformed by the real transformation
parameter values and by the estimated transformation parameter
values for the reference and the candidate image respectively.
The maximum, minimum and the number of displacements
larger than one pixel are also recorded. Our final decision is
based on having no displacement larger than one pixel.
For each percentage of the amount of the disturbance,
parameters are estimated and geometric and parameter errors
are calculated. To find the boundaries, the amount of errors is
increased until the estimated parameters result in a wrong
transformation.
3.4 Failure Mechanism
One obvious reason why the DE method may result in a wrong
transformation is when the obtained transformation has a lower
energy value, given the simulated errors, then the energy value
that corresponds to the real transformation. I.e. in this case the
minimum of the energy function is no longer corresponding to
the real solution.
Another case occurs when the estimated parameter values are
wrong although their energy is higher than the energy of the
real parameter values. This case corresponds to the failure of
the optimizer in finding the global minima with our settings
even if the minimum is shifted. If the DE setting parameters are
not sensitive enough, if may be necessary to increase the
number of generations, NG, in combination with using a smaller
multiplication factor, F, and a small cross over probability, pc,
to find the global minimum. In our parameter space, the special
projective parameters v, and v 2 (i.e. the fifth and sixth
parameters) are less sensitive than the other transformation
parameter of Equation 1 in changing energy value especially by
increasing amount of disturbances. This sensitivity is reduced
by increasing the amount of disturbances. Changing the
optimizer settings in these cases is likely to succeed, of course
at the cost of increasing the computational effort. The added
value seems not high which results either in very little
increasing acceptance boundary or very little increasing the
rejection boundary. We consider this case also as a failure.
The amount of the disturbances is increased until the global
minimum no longer corresponds to the real parameter values.
Then the amount of errors is reduced and the optimizer is run a
few times till the result of all runs are correct. Otherwise the
errors are reduced and run again.
The above-mentioned procedure is done for both simulation
types to find the minimum amount of disturbances cause failure.
The method therefore can handle disturbances lower than this
amount.
4. RESULTS
Our image sequences are recorded from a non-stable platform,
in this case a helicopter hovering above a highway. These
image sequences are used to collect statistics concerning the
behavior of drivers of all vehicles on a highway stretch in busy
(nearly congested) traffic during an elongated period of time.
Typically, we record highway stretches with a length of
300~500m during one hour or more. We use a b/w camera with
1392 x 1040 pixels which gives a ground resolution of approx.
25-40cm, at a frame rate of 15 fps. The transformation
parameters (S, 0, t t , t 2 , v /( v 2 ) used for the simulation in this
paper are:
[0.9942 -0.7184 6.3931 8.1876 1.1395e-5 -2.4079e-5]
The number of generation, NG, population size, q,
multiplication factor, F, and cross over probability, pc, are
respectively 50, 16, 0.6, and 0.55. All the calculations are done
in a second fine image scale of an image pyramid and the
results are scaled up. The range of the parameters for the
maximum 10 pixel movement is:
[1-0.0912 -0.8232 -10 -10 -2e-5 -3.7e-5]
[1+0.0912 0.8232 10 10 2e-5 3.7e-5]
respectively for lower and higher band. The resolution of the
parameters for one pixel movement is:
[1+0.0091 0.0823 1 1 2e-6 3.7e-6]
Figure 1 and Figure 2 demonstrate the maximum amount of
allowed moving objects and illumination variations respectively
for two different data sets. The result represents the fact that the
second data set (highway crossing) can handle both a large
amount of moving objects and a larger amount of illumination
variations. The boundaries of the acceptance of the method are
represented in Figure 3 and Figure 4 as the amount before the
star on the x-axis for the moving objects and illumination
variations respectively for two the different data sets. The
amount after the star indicates the rejection boundaries either
because of the failure of the optimizer within our settings, the
amount between the star and the rectangle, or because of the
real failure, the amount after the rectangle. The star is an
example of the optimizer failure. The y-axis demonstrates the
absolute parameter error divided by the resolution. This error is
visualized for each parameter.
Figure 1: Moving objects before failure in data set 1 (up) and
data set 2 (down). The left figures are the reference images and
the right ones are the candidate images. The difference between
the images is the transformation of the whole image and object
motion.
