The International Archives of the Photogrammetry, Remote Sensing and Spatial Information Sciences. Vol. XXXVII. Part Bl. Beijing 2008
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RPC model refinement (Tao et. al. 2004). Ritesh et. al (2006)
evaluated various algorithms for generation of drainage network
from Cartosat-1 DEM. Li et. al. (2007) studied the 3D geo
positioning accuracies by integrating IKONOS and QuickBird
stereo images using rational polynomial coefficients.
On the basis of these demonstrative studies, an attempt has been
made to find out the planimetric and elevation accuracies of the
DEM and Ortho image from Cartosat-1 stereo data. The RMS
error was computed at GCPs and Check points by varying the
number of GCPs and polynomial order for refinement of RPCs.
Terrain parameters such as slope, aspect, and drainage network
has been extracted from DEM.
2. OBJECTIVES
The prime objective of the study is to generate DEM using
Cartosat-1 data and derive terrain parameters. The detailed
objectives of the study are as follows.
• Experimental design and execution of DGPS survey
and establishment of Ground Control Points (GCPs).
• To study the effect of number of GCPs and order of
polynomial for RPC refinement for the generation of
DEM
• Generation of DEM and Ortho image from Cartosat-1
stereo data
• Effect of DEM resolution / accuracy on ortho image
generation
• To retrieve the terrain parameters such as slope,
aspect and drainage network. Comparative evaluation
of the drainage order derived from different DEM
resolutions.
3. STUDY AREA
Part of Alwar District, Rajasthan state, India was taken up for
the study. The area falls between 27°30’ and 27° 50’ in latitude
and 76°30’ and 76°50’ in longitude respectively. The study area
has heterogeneous terrain with elevation ranging from 200 to
600 meters in WGS 84 datum approximately. The major
cultural features include Arravali range, Alwar city, Shyamaka
Reserve Forest etc.
4. DATA USED
Cartosat-1 stereo data acquired on 4 th November, 2005 was
used for the study. The details of the data are given in Table 1.
Sensor
Path
Row
Orbit
No
Sun
Elevation
Sun
Azimuth
PAN AFT/
PAN FORE
0523
0270
2713
44.5740°
159.6077°
Table 1. Details of the Cartosat-1 data used
DGPS observations at Control points, IGS data observations,
ancillary files and GPS satellite precise orbit file.
5. RATIONAL FUNCTIONS
A sensor model relates 3D object point positions to their
corresponding image positions through the collinearity
condition equations. The RFM relates object space coordinates
to the image space coordinates. The image pixel coordinates (x,
y) are expressed as ratios of polynomials of ground coordinates
(X, Y, Z). Generally they are represented as third order
polynomials. Ratios have a forward form:
x = P! (X,Y,Z) / P 2 (X,Y,Z) (1)
y - P 3 (X,Y,Z) / P 4 (X,Y,Z)
This equation is called upward RF. Usually RF model is
generated based on a rigorous sensor model.
Pi ( i =1,2,3 and 4) are the polynomial functions with the
following general form:
Pi = an + a 2 i X + a 3i Y + a 4 ;Z + a 3 jXY + a&XZ + a 7 iYZ +
a 8i X + a9i Y 2 + a 10 i Z 2 + am XYZ + a 32 i X Y + am
XZ 2 +a 14i YX 2 + a 15i YZ 2 +a 16i ZX 2 + a 17i Z Y 2
+ a 18i X 3 + a 19i Y 3 + a 20 i Z 3 (2)
The order of the terms is trivial and may vary in different
literature. The number of coefficients in the polynomial can be
reduced gradually by applying different conditions (P 2 =P 4 ) &
(P 2 =P 4 =1). The first coefficient in the denominator is known
(a 2 =a 4 =l). A minimum of 7, 19, and 39 GCPs are required to
resolve the first, second and third-order RFM having 14, 38 and
78 number of RPCs respectively.
Refinement with polynomials corrects the remaining error and
refines the mathematical solution. Values between 0 and 3 can
be selected to correct the original rational function model. The
0 th order results in a simple shift to both image x and y
coordinates. The 1st order is an affine transformation. The 2 nd
order results in a second order transformation; the 3 rd order a
third order transformation. In general, a 0 th or 1 st polynomial
order is sufficient to reduce error not addressed by the rational
function model. A higher order polynomial requires more GCPs.
6. METHODOLOGY
A standard methodology has been adopted for the generation of
DEM, ortho Image and terrain parameter retrieval and is shown
in Figure 1. It comprises of reconnaissance survey and DGPS
survey, establishment of reference station by network
adjustment with IGS stations, establishment of a sub reference
station with respect to reference station, establishment of GCPs
with respect to sub-reference station, stereo data analysis using
RPCs and updation of RPCs using GCPs, generation of DEM,
Ortho image, retrieval terrain parameter from DEM, accuracy
assessment of DEM and ortho image, generation of DEM by
refining Rational Polynomial Coefficients (RPCs) with different
number and distribution of GCPs, validating the DEM,
generating the DEM, Ortho images at the best check point
RMSE and extraction of terrain parameters.
7. DATA ANALYSIS
Establishment of GCPs
One of the most important parameter for DEM generation and
validation is to establish the coordinates of the GCP’s. The GCP
coordinates are required for geo-referencing the satellite
imagery and also in the bundle adjustment for generation of
DEM. In addition to this, it is also required to have some
GCP’s for validation of DEM. These were established using
