Borre, Kai
Mathematical Foundation of Geodesy
1. Linear Equations
2. The Adjustment Procedure in Tensor Form
3. The Theory of Rounding Errors in the Adjustment by Elements of Geodetic Networks
4. A Contribution to the Mathematical Foundation of Physical Geodesy
5. A Remark on Approximation of
6. On the Geometry of Adjustment
7. Remarks to the Discussion Yesterday
8. Letters on Molodenskiy’s Problem
9. On the Spectrum of Geodetic Networks
10. Mathematical Geodesy
11. Foundation of a Theory of Elasticity for Geodetic Networks
12. Integrated Geodesy
13. On Potential Theory
14. La Formule de Stokes Est-Elle Correcte?
15. Some Remarks About Collocation
16. Apropos Some Recent Papers by Willi Freeden on a Class of Integral Formulas in the Mathematical Geodesy
17. S-Transformation or How to Live Without the Generalized Inverse—Almost
18. Integrated Geodesy
19. A Measure for Local Redundancy—A Contribution to the Reliability Theory for Geodetic Networks
20. A Convergence Problem in Collocation Theory
21. Non-Linear Adjustment and Curvature
22. Mechanics of Adjustment
23. Angelica Returning or The Importance of a Title
24. Evaluation of Isotropic Covariance Functions of Torsion Balance Observations
25. Contribution to the Geometry of the Helmert Transformation
26. Letter on a Problem in Collocation Theory
27. Approximation to The Earth Potential From Discrete Measurements
28. An Old Procedure for Solving the Relative Orientation in Photogrammetry
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- Author(s)
- Borre, Kai
- Publisher
- Springer
- Publication year
- 2006
- Language
- en
- Edition
- 1
- Category
- Natural Sciences
- Format
- Ebook
- eISBN (PDF)
- 9783540337676