193613
CZ-ZdVUG
20190130112005.0
Differential geometry of equipotential surfaces and its relation to parameters of Earth?s gravity field models
https://www.rvvi.cz/riv?s=rozsirene-vyhledavani&ss=detail&n=0&h=RIV%2F00025615%3A_____%2F15%3A%230002198%21RIV16-GA0-00025615
2015
International Union Of Geodesy and Geophysics
clanky_vugtk
Nesvadba, Otakar
holota
riv
utvar24
audiovizuĂˇlnĂ tvorba
According to adopted conventions the notion of an equipotential surface of the Earth?s gravity potential is of key importance for vertical datum definition. The aim of this contribution is to focus on differential geometry properties of equipotential surfaces and their relation to parameters of Earth?s gravity field models. Within this concept one can apply a number of tools. The discussion mainly rests on the use of Weingarten?s theorem that has an important role in the theory of surfaces and in parallel an essential tie to Brun?s equation (for gravity gradient) well known in physical geodesy. Also Christoffel?s theorem and its use will be mentioned. These considerations are of constructive nature and numerically their content will be demonstrated forhigh degree and order gravity field models. The results will be interpreted globally and also in merging segments expressing regional and local features of the gravity field of the Earth. They may contribute to the knowledge important fo
Holota, Petr
ABC039
eng
ABC039
cze