Title: ELLIPSOIDAL CORRECTIONS TO GRAVIMETRIC GEOID COMPUTATIONS
1ELLIPSOIDAL CORRECTIONS TO GRAVIMETRIC GEOID
COMPUTATIONS
Sten Claessens and Will Featherstone Western
Australian Centre for Geodesy Curtin University
of Technology Perth, Australia
IGFS 2006, ISTANBUL
2EXISTING ELLIPSOIDAL CORRECTION METHODS
Introduction (1/2)
- Many methods to compute ellipsoidal corrections
to geoid heights exist - all rely on approximations to the order of the
square of the eccentricity of the ellipsoid - many are limited to the use of only one or two
choices of reference radius R - many can not be applied if the Stokes kernel is
modified - many are complicated and/or computationally
inefficient - they generally dont agree with one another
3REPRESENTATION OF ELLIPSOIDAL CORRECTIONS
Introduction (2/2)
- Ellipsoidal corrections to geoid heights can be
represented by - an integration over the sphere or ellipsoid
- a spherical harmonic expansion
- The spherical harmonic representation is
preferred, because - computation of corrections is practical and
efficient, due to the domination of long
wavelengths - The spherical harmonic coefficients beyond
degree 20 only contribute 10 of the total
ellipsoidal correction
4DEFINITION OF ELLIPSOIDAL CORRECTIONS
Formulation (1/3)
ellipsoidal geoid height
spherical geoid height
5DEFINITION OF ELLIPSOIDAL CORRECTIONS
Formulation (1/3)
ellipsoidal geoid height
spherical geoid height
ellipsoidal correction
6COMPUTATION OF CORRECTION COEFFICIENTS
Formulation (2/3)
- Spherical harmonic synthesis and analysis
7COMPUTATION OF CORRECTION COEFFICIENTS
Formulation (2/3)
- Spherical harmonic synthesis and analysis
- or
- Spherical harmonic coefficient transformation
8RECAPITULATION
Formulation (3/3)
- Ellipsoidal corrections can easily be described
by surface spherical harmonic coefficients - computation of the coefficients is
straightforward, application of the coefficients
even more so - no approximations to the order of the
eccentricity of the ellipsoid are required (even
though all existing methodologies rely on them)
9INFLUENCE OF THE REFERENCE SPHERE RADIUS
Choice of reference sphere (1/5)
Ellipsoidal corrections depend upon the choice of
the reference sphere radius R Many existing
formulations only allow for one or two choices of
R
method radius
Moritz (1980)
Fei Sideris (2000)
Heck Seitz (2003)
Sjöberg (2003) separate scale factor
10Choice of reference sphere (2/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS
11Choice of reference sphere (2/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS
12A VARIABLE REFERENCE SPHERE RADIUS
Choice of reference sphere (3/5)
The reference sphere radius can be set equal to
the ellipsoidal radius for each computation
point The ellipsoidal correction coefficients
can still be found
13Choice of reference sphere (4/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS
14Choice of reference sphere (5/5)
SPHERICAL HARMONIC SPECTRA OF ELLIPSOIDAL
CORRECTIONS
15Choice of reference sphere (5/5)
SPHERICAL HARMONIC SPECTRA OF ELLIPSOIDAL
CORRECTIONS
16Choice of reference sphere (5/5)
SPHERICAL HARMONIC SPECTRA OF ELLIPSOIDAL
CORRECTIONS
17Choice of reference sphere (5/5)
SPHERICAL HARMONIC SPECTRA OF ELLIPSOIDAL
CORRECTIONS
18ELLIPSOIDAL CORRECTIONS FOR MODIFIED KERNELS
Modified kernels (1/5)
The combined geoid solution with modified
kernel is equivalent to the simple Stokes
integral
19ELLIPSOIDAL CORRECTIONS FOR MODIFIED KERNELS
Modified kernels (1/5)
The combined geoid solution with modified
kernel is equivalent to the simple Stokes
integral ? ellipsoidal corrections are also the
same, unless an additional approximation is
applied
20ELLIPSOIDAL CORRECTIONS FOR MODIFIED KERNELS
Modified kernels (1/5)
The combined geoid solution with modified
kernel is equivalent to the simple Stokes
integral ? ellipsoidal corrections are also the
same, unless an additional approximation is
applied
21ELLIPSOIDAL CORRECTIONS FOR MODIFIED KERNELS
Modified kernels (1/5)
The combined geoid solution with modified
kernel is equivalent to the simple Stokes
integral ? ellipsoidal corrections are also the
same, unless an additional approximation is
applied
22ELLIPSOIDAL CORRECTIONS FOR MODIFIED KERNELS
Modified kernels (1/5)
The combined geoid solution with modified
kernel is equivalent to the simple Stokes
integral ? ellipsoidal corrections are also the
same, unless an additional approximation is
applied
23ELLIPSOIDAL CORRECTIONS FOR MODIFIED KERNELS
Modified kernels (1/5)
The combined geoid solution with modified
kernel The ellipsoidal correction becomes
24THE SPHEROIDAL STOKES KERNEL
Modified kernels (2/5)
Wong and Gore (1969) modification
?
25THE SPHEROIDAL STOKES KERNEL
Modified kernels (2/5)
Wong and Gore (1969) modification
?
global absolute maximum of ellipsoidal
corrections (excluding first degree term)
64.4 mm 41.5 mm 6.6 mm
44.4 mm 29.5 mm 0.6 mm
26THE MOLODENSKY-MODIFIED SPHEROIDAL STOKES KERNEL
Modified kernels (3/5)
Vanícek and Kleusberg (1987) modification
?
27Modified kernels (4/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS
28Modified kernels (4/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS
29Modified kernels (4/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS
30Modified kernels (5/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS (n ? 2)
31Modified kernels (5/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS (n ? 2)
32Modified kernels (5/5)
ELLIPSOIDAL CORRECTIONS TO GEOID HEIGHTS (n ? 2)
33Summary and Conclusions
- Ellipsoidal corrections can easily be computed
using surface spherical harmonic coefficients of
the disturbing potential and gravity anomalies
34Summary and Conclusions
- Ellipsoidal corrections can easily be computed
using surface spherical harmonic coefficients of
the disturbing potential and gravity anomalies - Ellipsoidal corrections to modified kernels can
be found using the same set of correction
coefficients
35Summary and Conclusions
- Ellipsoidal corrections can easily be computed
using surface spherical harmonic coefficients of
the disturbing potential and gravity anomalies - Ellipsoidal corrections to modified kernels can
be found using the same set of correction
coefficients - Choosing the reference radius equal to the
ellipsoidal radius significantly reduces the
high-frequent power of the ellipsoidal
corrections - The spherical harmonic coefficients beyond
degree 20 only contribute 2 of the total
ellipsoidal correction (less than 1 cm anywhere
on Earth)