Galerkin’s Matrix for Neumann’s Problem in the Exterior of an Oblate Ellipsoid of Revolution: Gravity Potential Approximation by Buried Masses
The result's identifiers
Result code in IS VaVaI
<a href="https://www.isvavai.cz/riv?ss=detail&h=RIV%2F00025615%3A_____%2F19%3AN0000003" target="_blank" >RIV/00025615:_____/19:N0000003 - isvavai.cz</a>
Result on the web
<a href="https://link.springer.com/article/10.1007/s11200-017-1083-x" target="_blank" >https://link.springer.com/article/10.1007/s11200-017-1083-x</a>
DOI - Digital Object Identifier
<a href="http://dx.doi.org/10.1007/s11200-017-1083-x" target="_blank" >10.1007/s11200-017-1083-x</a>
Alternative languages
Result language
angličtina
Original language name
Galerkin’s Matrix for Neumann’s Problem in the Exterior of an Oblate Ellipsoid of Revolution: Gravity Potential Approximation by Buried Masses
Original language description
The paper is motivated by the role of boundary value problems in Earth’s gravity field studies. The discussion focuses on Neumann’s problem formulated for the exterior of an oblate ellipsoid of revolution as this is considered a basis for an iteration solution of the linear gravimetric boundary value problem in the determination of the disturbing potential. The approach follows the concept of the weak solution and Galerkin’s approximations. The solution of the problem is approximated by linear combinations of basis functions with scalar coefficients. The construction of Galerkin’s matrix for basis functions generated by elementary potentials (point masses) is discussed. Ellipsoidal harmonics are used as a natural tool and the elementary potentials are expressed by means of series of ellipsoidal harmonics. The problem, however, is the summation of the series that represent the entries of Galerkin’s matrix. It is difficult to reduce the number of summation indices since in the ellipsoidal case there is no analogue to the addition theorem known for spherical harmonics. Therefore, the series representation of the entries is analyzed. Hypergeometric functions and series are used. Moreover, within some approximations the entries are split into parts. Some of the resulting series may be summed relatively easily, apart from technical tricks. For the remaining series the summation was converted to elliptic integrals. The approach made it possible to deduce a closed (though approximate) form representation of the entries in Galerkin’s matrix. The result rests on concepts and methods of mathematical analysis. In the paper it is confronted with a direct numerical approach applied for the implementation of Legendre’s functions. The computation of the entries is more demanding in this case, but conceptually it avoids approximations. Some specific features associated with function bases generated by elementary potentials in case of the ellipsoidal solution domain are illustrated and discussed.
Czech name
—
Czech description
—
Classification
Type
J<sub>imp</sub> - Article in a specialist periodical, which is included in the Web of Science database
CEP classification
—
OECD FORD branch
10102 - Applied mathematics
Result continuities
Project
Result was created during the realization of more than one project. More information in the Projects tab.
Continuities
P - Projekt vyzkumu a vyvoje financovany z verejnych zdroju (s odkazem do CEP)
Others
Publication year
2019
Confidentiality
S - Úplné a pravdivé údaje o projektu nepodléhají ochraně podle zvláštních právních předpisů
Data specific for result type
Name of the periodical
Studia Geophysica et Geodaetica
ISSN
0039-3169
e-ISSN
1573-1626
Volume of the periodical
63
Issue of the periodical within the volume
1
Country of publishing house
CZ - CZECH REPUBLIC
Number of pages
34
Pages from-to
1-34
UT code for WoS article
000459512900001
EID of the result in the Scopus database
2-s2.0-85058938955