The International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences. Vol. XXXVII. Part Bl. Beijing 2008
The organization of the paper is as follows. At the first,
definition of system errors and their influence with respect to
mapping results are described. The paper focuses on the
proposed error model, and its linearization is presented. The
subsequent discussion concerns the recovery of the main error
parameters such as range error and bore-sight angles and the
analysis of control and tie information. Finally, paper provides
a brief summary, and an outlook for further work.
2. ERROR SOURCES
Generally speaking, there are three types of errors during a
process of measurement: blunders, systematic biases and
random errors. Blunders are significantly larger than the other
two types. They can be easy detected and eliminated with use
of empirical parameters. Random errors are always present and
can never be eliminated, however, can be minimized by
least-square solution and redundant observations. As to
systematic errors, they are caused by imperfect instruments.
They can be represented through some parameters, which are
estimated by a mathematic model from redundant observations.
The type of errors including range error, scan angle errors,
bore-sight angles and level arms from the INS system to the
laser local coordinate system are emphatically discussed in this
section.
2.1 Range Error and Scan Angle Errors
The ranging measurement is determining the time-of-flight of a
light pulse, i.e., by measuring the travelling time between the
emitted and the received pulse. Various factors contribute to the
range error. It has relation with not only optical and electronical
designment but also target reflectivity because range accuracy
is inversely proportional to the square root of the
signal-to-noise ratio(S/N).The S/N lie on many factors, such as
power of emitted and received signal, input bandwidth,
background radiation, responsivity of the signal detector, etc.
Furthermore, if airplane flies on rather a better altitude as 2000
m, range error is dependent on the atmospheric disturbances
because of variability of atmospheric refractive index. For
simplicity, herein, it is regarded as unknown small constant.
Scan angle errors are depicted in Fig.l The ideal system is
systemtric to the z-axis with a scan angle 6. The real scanning
system is rotated by the alignment error a and the scan angle
is 0 . It chiefly includes the following three error sources:
Alignment error a the zero degree direction (broken line
Z-axis) and the plumb line (real line Z-axis) may not coincide.
The angle bias a is amounted to adding a constant angle k to
scan angle.
Scan angle error AO an inaccurate scan angle affect scan angle.
It does not suffer from non-linear effects and is therefore
omitted.
Scan plane error expresses that the scan plane and the X-axis
are not perpendicular. The offset is described by the two
exceeding small angular errors. So it is omitted as well as.
The alignment angle influences on the mapping result more
than the latter two errors. Therefore, we contribute the
alignment angle to error model. These errors result to
non-linear effect to the laser points position, in particular, at the
end of the swath as the reported paper(Crombaghs,2000).
2.2 Bore-sight Angles and Level-arm Vector
Considering mounting errors of the laser scanning (LS) sensor
with respect to the INS sensor, the LS and INS coordinate
system are not parallel. The alignment error is expressed by the
small rotation matrix. The bore-sight angles are the main aim of
the recovery system errors because they are determined well by
other means. Therefore, the bore-sight angles must be estimated
more precisely during an in-flight calibration procedure. The
practical influence of the bore-sight on the mapping result is
demonstrated by Fig. 2. This figure shows a cross-section of a
building. It is illustrated with the profile that the discrepancies
due to bore-sight angles are clearly visible on the inclined
planes.
Figure 2. Effect of bore-sight errors on a cross-section profile
of a building roof from 2 flight lines of different directions and
heights
The magnitude of the lever-arm vector between LS and INS
origins can be measured quite accurately. It is usually neglected.
As for the lever-arm vector between the center of GPS antenna
and INS origins, the measuring accuracy can achieve to the
level of cm after installation on the ground. As mention above,
if the bore-sight angles are considerably larger, the level-arm
vector is thus not as accurate as its magnitude, so larger
level-arm quantities may be expected, i.e., they can not be
omitted. There errors exhibit to some extent linear effect to the
laser points (Crombaghs,2000).
2.3 INS Errors and GPS Errors
INS errors are derived from shift or drift of INS sensor. GPS
errors are caused by some factors such as differential
troposphere, ionosphere delay, multipath and clock biases, etc..
Certainly, they are contributing to the mapping accuracy and
are determined as estimated parameters added to the adjusting
model (Filin and Vosselman, 2004). However, it is difficult to
estimate these, and even the quality of the unknown parameters
estimates may be degraded as additional correlation. At present,
the POSPAC software of version 4.4 produced by APPLANIX
company can implement the difference of GPS based on
multi-base Kalman Filter and integrated inertial navigation and
smoothing optimization, which achieve a level that the residual
effect in GPS/INS trajectory estimation are lower than 0.05m
and 0.005° in position and attitude respectively under the
optimization of the calibration area and the flight conditions.
Fig.3 depicts the position RMS error derived from GPS/INS
processing by POSPAC software. So the additional parameters
of INS and GPS biases are not added to the estimated model.
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