```000195968 001__ 195968
000195968 003__ CZ-ZdVUG
000195968 005__ 20191209131602.0
000195968 041__ \$\$aeng
000195968 040__ \$\$aABC039\$\$bcze
000195968 1001_ \$\$aHolota, Petr
000195968 24510 \$\$aTransformation of Topography into the Structure of Laplace’s Operator and an Iteration Solution of the Linear Gravimetric Boundary Value Problem
000195968 300__ \$\$a1 strana
000195968 5203_ \$\$aThe discussion starts with the relation between the geometry of the solution domain and the structure of Laplace’s operator. A transformation of coordinates is used that offers a possibility for an alternative between the boundary complexity and the complexity of the coefficients of the partial differential equation governing the solution. The structure of the Laplace operator is relatively simple in terms of ellipsoidal coordinates which are frequently used in geodesy. However, the physical surface of the Earth substantially differs from an oblate ellipsoid of revolution, even if optimally fitted. Therefore, a system of general curvilinear coordinates such that the physical surface of the Earth is imbedded in the family of coordinate surfaces is used. Clearly, the structure of Laplace’s operator is more complex after the transformation. It was deduced by means of tensor calculus and in a sense it reflects the topography of the physical surface of the Earth. Nevertheless, the construction of the respective Green’s function is simpler for the solution domain transformed. This enables the use of the classical Green’s function method together with successive approximations for the solution of the linear gravimetric boundary value problem expressed in terms of new coordinates. The structure of the iteration steps is analyzed and where suitable and possible modified by means of the integration by parts. Stability and comparison with other methods are discussed.
000195968 655_4 \$\$aanotace
000195968 7730_ \$\$92018
000195968 8564_ \$\$uhttp://meetingorganizer.copernicus.org/EGU2018/EGU2018-18592.pdf
000195968 85642 \$\$ahttps://www.rvvi.cz/riv?s=rozsirene-vyhledavani&ss=detail&n=0&h=RIV%2F00025615%3A_____%2F18%3AN0000052%21RIV19-MSM-00025615
000195968 910__ \$\$aABC039
000195968 980__ \$\$aclanky_vugtk
000195968 985__ \$\$aholota
000195968 985__ \$\$ariv
000195968 985__ \$\$autvar24