Related references
Note: Only part of the references are listed.Spheroidal forward modelling of the gravitational fields of 1 Ceres and the Moon
M. Sprlak et al.
ICARUS (2020)
A line integral approach for the computation of the potential harmonic coefficients of a constant density polyhedron
Olivier Jamet et al.
JOURNAL OF GEODESY (2020)
Fourier-domain modeling of gravity effects caused by polyhedral bodies
Leyuan Wu
JOURNAL OF GEODESY (2019)
Spherical Harmonic Expansions for the Gravitational Field of a Polyhedral Body with Polynomial Density Contrast
Cheng Chen et al.
SURVEYS IN GEOPHYSICS (2019)
Polynomial-based density inversion of gravity anomalies for concealed iron-deposit exploration in North China
Jie Liu et al.
GEOPHYSICS (2019)
Analytical Solutions of Gravity Vector and Gravity Gradient Tensor Caused by a 2D Polygonal Body with a 2D Polynomial Density Contrast
Li Wan et al.
SURVEYS IN GEOPHYSICS (2019)
A spectral-domain approach for gravity forward modelling of 2D bodies
Cheng Chen et al.
JOURNAL OF GEODESY (2019)
Gravity Gradient Tensor of Arbitrary 3D Polyhedral Bodies with up to Third-Order Polynomial Horizontal and Vertical Mass Contrasts
Zhengyong Ren et al.
SURVEYS IN GEOPHYSICS (2018)
Efficient Modeling of Gravity Fields Caused by Sources with Arbitrary Geometry and Arbitrary Density Distribution
Leyuan Wu
SURVEYS IN GEOPHYSICS (2018)
Gravity Anomaly of Polyhedral Bodies Having a Polynomial Density Contrast
M. G. D'Urso et al.
SURVEYS IN GEOPHYSICS (2017)
Precise and Fast Computation of the Gravitational Field of a General Finite Body and Its Application to the Gravitational Study of Asteroid Eros
Toshio Fukushima
ASTRONOMICAL JOURNAL (2017)
Numerical integration of gravitational field for general three-dimensional objects and its application to gravitational study of grand design spiral arm structure
Toshio Fukushima
MONTHLY NOTICES OF THE ROYAL ASTRONOMICAL SOCIETY (2016)
Spheroidal and ellipsoidal harmonic expansions of the gravitational potential of small Solar System bodies. Case study: Comet 67P/Churyumov-Gerasimenko
Stefan Reimond et al.
JOURNAL OF GEOPHYSICAL RESEARCH-PLANETS (2016)
The Gravity Anomaly of a 2D Polygonal Body Having Density Contrast Given by Polynomial Functions
M. G. D'Urso
SURVEYS IN GEOPHYSICS (2015)
A numerical comparison of spherical, spheroidal and ellipsoidal harmonic gravitational field models for small non-spherical bodies: examples for the Martian moons
Xuanyu Hu et al.
JOURNAL OF GEODESY (2015)
PROLATE SPHEROIDAL HARMONIC EXPANSION OF GRAVITATIONAL FIELD
Toshio Fukushima
ASTRONOMICAL JOURNAL (2014)
Analytical computation of gravity effects for polyhedral bodies
M. G. D'Urso
JOURNAL OF GEODESY (2014)
On the evaluation of the gravity effects of polyhedral bodies and a consistent treatment of related singularities
M. G. D'Urso
JOURNAL OF GEODESY (2013)
Analytic solution of the gravity anomaly of irregular 2D masses with density contrast varying as a 2D polynomial function
Xiaobing Zhou
GEOPHYSICS (2010)
General line integrals for gravity anomalies of irregular 2D masses with horizontally and vertically dependent density contrast
Xiaobing Zhou
GEOPHYSICS (2009)
Recursive algorithms for the computation of the potential harmonic coefficients of a constant density polyhedron
Dimitrios Tsoulis et al.
JOURNAL OF GEODESY (2009)
An algorithm to calculate the gravity anomaly of sedimentary basins with exponential density-depth relationships
Alex Chappell et al.
GEOPHYSICAL PROSPECTING (2008)
2D vector gravity potential and line integrals for the gravity anomaly caused by a 2D mass of depth-dependent density contrast
Xiaobing Zhou
GEOPHYSICS (2008)
A comparison of the tesseroid, prism and point-mass approaches for mass reductions in gravity field modelling
B. Heck et al.
JOURNAL OF GEODESY (2007)
Gravimagnetic anomaly formulas for polyhedra of spatially linear media
H Holstein
GEOPHYSICS (2003)
Gravity anomalies of 2-D bodies with variable density contrast
JZ Zhang et al.
GEOPHYSICS (2001)
Ellipsoidal Harmonic expansions of the gravitational potential: Theory and application
G Romain et al.
CELESTIAL MECHANICS & DYNAMICAL ASTRONOMY (2001)
The gravitational potential and its derivatives for the prism
D Nagy et al.
JOURNAL OF GEODESY (2000)