the bai
* n § fte Leica
e ments were
scanner. The
1 cm distance
0 r eveal the
length, i
guii
1 5 m up to
:rv ed for the
■ r e used as
rements.
n from the
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ith the laser
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around the
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es between
vere made
was!
the target distances. The reference distance (i.e. a sort of origin)
for the obtained relative distances was thus the first
measurements about 1 m from the scanner.
Next, the relative distance differences of the tacheometer
measurements were subtracted from the relative distance
differences resulted from the laser scanner measurements. The
comparison method was thus a relative one, not an absolute one.
The standard deviation of the mean of four errors w (Figs. 6 and
7, and Eq. 4) was also calculated. For the error calculations, we
considered the tacheometer measurements as exact.
4. FORMULAS AND ERROR FUNCTION BY FOURIER
ANALYSIS
Calculations of the error function were carried out by using
Fourier analysis (Joeckel and Stober, 1989, Thibos, 2003,
Herman, 2002). Formulas are valid for equal sampling intervals.
Let v n =d nL - ¿/„r where d nL and d nT , n=0,...,N-\, are the relative
distances measured by the laser scanner and tacheometer,
respectively. The measurements were made at approximately
equally spaced intervals d„=nS, n=0,...,/V-l, where <5=0.1 m for
relative distances less than 4 m and <5=0.45 m for relative
distances over 4 m. The discrete Fourier transform of the
centered observations w„= v n - v , n=0,...,N-\ is given by
5. RESULTS
All measured relative distance errors are shown in Figure 5.
The y-axis describes the relative distance error of the scanner
v n =d„L - d n j, and the x-axis describes the relative distances
where the reference distance is about 1 m away from the
scanner. Relative distances of the x-axis are distances from the
reference distance.
12 ( mm )
8 *
■ Measured relative errors
N-1 N-1
u k = rd„)
ZTo NS
(1)
for k=0,...,N/2-\ (N is even). For the interval 0 m < d„ < 4 m
and 4 m <d„< 29 m , the highest maxima of the absolute value
of U k are located at wavelengths as explained in the following
tables (Tables 2 and 3).
4 .♦ Ì* * *
* ♦ , ♦ ♦♦ ♦♦
\* ♦
Ot-CM COTI-
Relative distance (m)
Relative distance 0-4 m
Corresponding
wavelength
00k/8
20.4/m
3.14/m
1.57/m
0.31 m
2.0 m
4.0 m
Table 2. Angular frequencies and wavelengths of highest
maxima at relative distances (0-4 m).
Relative distance 4-29 m
cOk/0
Corresponding
wavelength
0.24/m
25.6 m
5.14/m
1.22 m
Table 3. Angular frequencies and wavelengths of highest
maxima at relative distances (4-29 m).
The Fourier series yields a correction function for the relative
function is given by:
Figure 5. Measured relative distance errors.
Figure 6 illustrates measured relative errors between relative
distances 0 and 4 m, meanwhile Figure 7 shows comparable
relative errors for relative distances between 4 m and 29 m. The
standard deviation w„ (see Eq. 4) of the mean of relative errors
shown in graphics as error bars (Figs. 6 and 7) is calculated
from the four scanner measurements and from the mean value
of relative tacheometer measurements at each relative distance.
Scanner vectors at each relative distance were calculated so that
the 1 st measurement at the 1 m reference distance d() /fL was
subtracted from the 1 st measurement of n th distance d„ iiL , 2 nd
measurement of the reference distance do l was subtracted from
the 2 nd measurement of n th distance d„ , and so on.
2'
Corresponding relative distances d„ T for the tacheometer were
subtracted from these results. Average a n of four differences
were counted and then corresponding w n .
((k„L -d 0itL )-d nT )-a n f +...■+ ((k 4ii -d n<L )-d nT )~a„f
v
v„ = v +—£W cos K« + ^)=
N U
2 M
v+ — Y.a k coa(a> k n)+b k sm(a> k n)
Nim
