A method is proposed to evaluate the spherical harmonic coefficients of a global or regional, non-smooth, observable dataset sampled on an equiangular grid. The method is based on an integration strategy using new recursion relations. Because a bilinear function is used to interpolate points within the grid cells, this method is suitable for non-smooth data; the slope of the data may be piecewise continuous, with extreme changes at the boundaries. In order to validate the method, the coefficients of an axisymmetric model are computed, and compared with the derived analytical expressions. Numerical results show that this method is indeed reasonable for non-smooth models, and that the maximum degree for spherical harmonic analysis should be empirically determined by several factors including the model resolution and the degree of non-smoothness in the dataset, and it can be several times larger than the total number of latitudinal grid points. It is also shown that this method is appropriate for the approximate analysis of a smooth dataset. Moreover, this paper provides the program flowchart and an internet address where the FORTRAN code with program specifications are made available.
[1]
E. Hobson.
The Theory of Spherical and Ellipsoidal Harmonics
,
1955
.
[2]
J. A. R. Blais,et al.
Spherical harmonic analysis and synthesis for global multiresolution applications
,
2002
.
[3]
P. Swarztrauber,et al.
SPHEREPACK 3.0: A Model Development Facility
,
1999
.
[4]
Michael L. Burrows,et al.
A Recurrence Technique for Expanding a Function in Spherical Harmonics
,
1972,
IEEE Transactions on Computers.
[5]
N. Sneeuw.
Global spherical harmonic analysis by least‐squares and numerical quadrature methods in historical perspective
,
1994
.
[6]
L. P. Pellinen.
Physical Geodesy
,
1972
.
[7]
Volker Schönefeld.
Spherical Harmonics
,
2019,
An Introduction to Radio Astronomy.
[8]
U. Meyer,et al.
An Earth gravity field model complete to degree and order 150 from GRACE: EIGEN-GRACE02S
,
2005
.
[9]
F. Bryan,et al.
Time variability of the Earth's gravity field: Hydrological and oceanic effects and their possible detection using GRACE
,
1998
.
[10]
O. Colombo.
Numerical Methods for Harmonic Analysis on the Sphere
,
1981
.