1. Error Propagation in Geodetic Networks Studied by FEMLAB
- Author
-
Kai Borre
- Subjects
Matrix (mathematics) ,Propagation of uncertainty ,Covariance matrix ,Geodetic datum ,Function (mathematics) ,Boundary value problem ,Least squares ,Algorithm ,Network model ,Mathematics - Abstract
Geodetic networks can be described by discrete models. The observations may be height differences, distances, and directions. Geodesists always make more observations than necessary and estimate the solution by using the principle of least squares. Contemporary networks often contain several thousand points. This leads to so large matrix problems that one starts thinking of using continous network models. They result in one or more differential equations with corresponding boundary conditions. The Green’s function works like the covariance matrix in the discrete case. If we can find the Green’s function we also can study error propagation through large networks. Exactly this idea is exploited for error propagation studies in large geodetic networks. To solve the boundary value problems we have used the FEMLAB software. It is a powerful tool for this type of problems. The M-file was created by Daniel Bertilsson. Modifying the code is so simple that a student can do it. We demonstrate some results obtained this way. more...
- Published
- 2011
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