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Vector method to compute the Cartesian (X, Y, Z) to geodetic ($${\phi}$$, λ, h) transformation on a triaxial ellipsoid
Abstract The vector-based algorithm to transform Cartesian (X, Y, Z ) into geodetic coordinates ($${\phi}$$, λ, h) presented by Feltens (J Geod, 2007, doi:10.1007/s00190-007-0198-1) has been extended for triaxial ellipsoids. The extended algorithm is again based on simple formulae and has successfully been tested for the Earth and other celestial bodies and for a wide range of positive and negative ellipsoidal heights.
Vector method to compute the Cartesian (X, Y, Z) to geodetic ($${\phi}$$, λ, h) transformation on a triaxial ellipsoid
Abstract The vector-based algorithm to transform Cartesian (X, Y, Z ) into geodetic coordinates ($${\phi}$$, λ, h) presented by Feltens (J Geod, 2007, doi:10.1007/s00190-007-0198-1) has been extended for triaxial ellipsoids. The extended algorithm is again based on simple formulae and has successfully been tested for the Earth and other celestial bodies and for a wide range of positive and negative ellipsoidal heights.
Vector method to compute the Cartesian (X, Y, Z) to geodetic ($${\phi}$$, λ, h) transformation on a triaxial ellipsoid
Feltens, J. (author)
Journal of Geodesy ; 83
2008
Article (Journal)
English
BKL:
38.73
Geodäsie
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