References
- Amiri-Simkooei, A. R. 2013. Application of least squares variance component estimation to errors-in-variables models. Journal of Geodesy 87:935–944.
- Andersen, O. B. 2010. The DTU10 Global gravity field and mean sea surface–improvements in the Arctic. Presented in IGFS-2, Fairbanks, Alaska.
- Andersen, O. B. and R. Scharroo. 2011. Range and geophysical corrections in coastal regions. In: Vignudelli, S., A. G. Kostianoy, P. Cipollini, and J. Benveniste (eds.), Coastal Altimetry. Berlin/Heidelberg: Springer. ISBN: 978-3-642-12795-3.
- Crocetto, N., M. Gatti, and P. Russo. 2000. Simplified formulae for the BIQUE estimation of variance components in disjunctive observation groups. Journal of Geodesy 74:447–457.
- Denker, H. 2005. Evaluation of SRTM3 and GTOPO30 terrain data in Germany. International Association of Geodesy Symposia 129: 218–223.
- Denker, H. and I. N. Tziavos. 1998. Investigation of the Molodensky series terms for terrain reduced gravity field data. Bollettino di Geofisica Teorica e Applicata 40(3–4):195–203.
- Featherstone, W. E., M. C. Dentith, and J. F. Kirby. 1998. Strategies for the accurate determination of orthometric heights from GPS. Survey Review 34(267):278–296.
- Frankcombe, T. J., M. A. Collins, and D. Z. Zhang. 2012. Modified Shepard interpolation of gas-surface potential energy surfaces with strict plane group symmetry and translational periodicity. The Journal of Chemical Physics 137(14):144701.
- Gouretski, V. 2012. Using GEBCO digital bathymetry to infer depth biases in the XBT data, Deep-Sea Research I 62:40–52.
- Guo, D. M. and H. Z. Xu. 2011a. Research on the singular integral of local terrain correction computation. Chinese Journal of Geophysics 54(2):240–241.
- Guo, D. M. and H. Z. Xu. 2011b. Determination of Geoid Using GPS Leveling and Gravity Data. Geomatics and Information Science of Wuhan University 36(5):621–624.
- Haagmans, R., E. de Min, and M. von Gelderen. 1993. Fast evaluation of convolution integrals on the sphere using 1D FFT, and a comparison with existing methods for Stokes' integral. Manuscripta Geodaetica 18:227–241.
- Heiskanen, H. and H. Moritz. 1967. Physical Geodesy. San Francisco, CA: Freeman.
- Marti, U. 2002. Modelling of differences of height systems in Switzerland. Proceedings of the 3rd meeting of the International Gravity and Geoid Commission, Tziavos (ed.), Thessaloniki, Greece, 2002, pp. 378–388.
- Moritz, H. 1980. Advanced Physical Geodesy. Tunbridge Wells, UK: Abacus Press.
- Nahavandchi, H., A. Soltanpour, and E. Nyrnes. 2004. A new gravimetric geoidal height model 37 over Norway computed by the least-squares modification parameters. Jekeli, C., L. Bastos, and J. Fernandes (eds.), Gravity, Geoid and Space Missions GGSM 2004, Berlin/Heidelberg/New York: Springer, pp. 191−196.
- Omang, O. C. D. and R. Forsberg. 2000. How to handle topography in practical geoid determination: three examples. Journal of Geodesy 74:458–466.
- Pavlis, N. K., S. A. Holmes, S. C. Kenyon, and J. K. Factor. 2008. An earth gravitational model degree 2160: EGM2008. Presented at the 2008 General Assembly of the EuropeanGeosciences Union, Vienna, Austria, April 13–18.
- Rao, C. R. 1970. Estimation of heterogeneous variances in linear models. Journal of American Statistical Association 65:161–172.
- Sansò, F. and M. G. Sideris. 2013. Geoid Determination: Theory and Methods, Lecture Notes in Earth System Sciences. Berlin/Heidelberg, Germany: Springer-Verlag.
- Teunissen, P. J. G. and Amiri-Simkooei, A. R. 2008. Least-squares variance component estimation. Journal of Geodesy 82:65–82.
- Yanalak, M. and O. Baykal. 2001. Transformation of ellipsoid heights to local leveling heights. Journal of Surveying Engineering 127(3):90–103.
- Yang, Z. J. and Y. Q. Chen. 1999. Determination of local geoid with the geometric method—a case study. Journal of Surveying Engineering 125(3):136–146.
- Yang, Z. J. and Y. Q. Chen. 2001. Determination of the Hong Kong gravimetric geoid. Survey Review 36(279):23–34.