References
- Ascher, U. M., and E. Haber, 2001, Grid refinement and scaling for distributed parameter estimation problems: Inverse Problems, 17, 517–590.
- Chen, J., and J. Macnae, 1997, Terrain corrections are critical for airborne gravity gradiometer data: Exploration Geophysics, 28, 21–25.
- Davis, K., and Y. Li, 2007, A fast approach to magnetic equivalent source processing using an adaptive quadtree mesh discretization: Presented at the 19th Annual Conference and Exhibition, Australian Society of Exploration Geophysicists.
- Eso, R., and D. Oldenburg, 2007, Efficient 2.5D resistivity modeling using a quadtree discretization: Conference Proceedings, 381–385, Symposium of Applied Geophysics on Engineering and Envirnmental Problems.
- Frey, P. J., and L. Marechal, 1998, Fast adaptive quadtree mesh generation: 7th International Meshing Roundtable, 211–224, Sandia National Laboratories.
- Gerstner, T., 1999, Adaptive hierarchical methods for landscape representation and analysis: Lecture Notes in Earth Sciences, 78, 75–92.
- Hammer, S., 1939, Terrain corrections for gravimeter stations: Geophysics, 4, 184-194.
- ——–, 1974, Topographic and terrain correction for airborne gravity: Geophysics, 39.
- Kass, M., and Y. Li, 2008, Practical aspects of terrain correction in airborne gravity gradiometry surveys: Exploration Geophysics, 39, 198–203.
- Li, Y., 2001, 3D inversion of gravity gradiometry data: Presented at the 71st Annual International Meeting, Society of Exploration Geophysicists.
- Reid, A. B., 1980, Aeromagnetic survey design: Geophysics, 45, 973–976.
- Sharma, P. V., 1966, Rapid computation of magnetic anomalies and demagnetization effects caused by bodies of arbitrary shape: Pure and Applied Geophysics, 64, 89–109.
- Zhang, C., M. F. Mushayandebvu, A. B. Reid, J. D. Fairhead, and M. E. Odegard, 2000, Euler deconvolution of gravity tensor gradient data: Geophysics, 65, 512–520.