Surveys in Geophysics, ISSN 0169-3298, 07/2017, Volume 38, Issue 4, pp. 781 - 832

We analytically evaluate the gravity anomaly associated with a polyhedral body having an arbitrary geometrical shape and a polynomial density contrast in both...

Gravity anomaly | Polyhedral bodies | Singularity | Polynomial density contrast | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | ISOTROPIC HALF-SPACES | GRAVITATIONAL ATTRACTION | 2-DIMENSIONAL BODIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | RECTANGULAR PRISM | ANALYTICAL EXPRESSION | MAGNETIC-ANOMALIES | Specific gravity | Analysis | Gravity | Gravitation | Shape | Polyhedra | Polyhedrons | Potential theory | Density | Exploitation | Gravity anomalies | Accuracy | Algebra | Mathematical analysis | Polynomials

Gravity anomaly | Polyhedral bodies | Singularity | Polynomial density contrast | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | ISOTROPIC HALF-SPACES | GRAVITATIONAL ATTRACTION | 2-DIMENSIONAL BODIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | RECTANGULAR PRISM | ANALYTICAL EXPRESSION | MAGNETIC-ANOMALIES | Specific gravity | Analysis | Gravity | Gravitation | Shape | Polyhedra | Polyhedrons | Potential theory | Density | Exploitation | Gravity anomalies | Accuracy | Algebra | Mathematical analysis | Polynomials

Journal Article

Journal of Geodesy, ISSN 0949-7714, 1/2014, Volume 88, Issue 1, pp. 13 - 29

On the basis of recent analytical results we derive new formulas for computing the gravity effects of polyhedral bodies which are expressed solely as function...

Polyhedron | Earth Sciences | Gravitational potential | Singularities | Numerical computation | Geophysics/Geodesy | Earth Sciences, general | OPTIMUM EXPRESSION | GEOCHEMISTRY & GEOPHYSICS | HOMOGENEOUS POLYHEDRON | REMOTE SENSING | FIELD | GRAVITATIONAL ATTRACTION | RECTANGULAR PRISM | BODY | Asteroids | Gravity | Geodetics | Numerical analysis | Polyhedra

Polyhedron | Earth Sciences | Gravitational potential | Singularities | Numerical computation | Geophysics/Geodesy | Earth Sciences, general | OPTIMUM EXPRESSION | GEOCHEMISTRY & GEOPHYSICS | HOMOGENEOUS POLYHEDRON | REMOTE SENSING | FIELD | GRAVITATIONAL ATTRACTION | RECTANGULAR PRISM | BODY | Asteroids | Gravity | Geodetics | Numerical analysis | Polyhedra

Journal Article

Surveys in Geophysics, ISSN 0169-3298, 3/2017, Volume 38, Issue 2, pp. 479 - 502

During the last 15 years, more attention has been paid to derive analytic formulae for the gravitational potential and field of polyhedral mass bodies with...

Earth Sciences | Horizontal and vertical mass contrasts | Polyhedral body | Geophysics/Geodesy | Earth Sciences, general | Singularity-free | Prism | Astronomy, Observations and Techniques | Gravity | OPTIMUM EXPRESSION | LINEARLY VARYING DENSITY | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | GRAVITATIONAL ATTRACTION | JOINT INVERSION | GEOCHEMISTRY & GEOPHYSICS | UNSTRUCTURED GRIDS | RIGHT RECTANGULAR PRISM | AIRBORNE GRAVITY | MINERAL EXPLORATION | Sedimentary basins | Analysis | Polyhedra | 3-D technology | Geophysics | Gravity anomalies | Gravitation | Mathematical analysis | Exact solutions | Gravitational fields | Mathematical models | Polynomials | Density | Naturvetenskap | Geofysik | Natural Sciences | Earth and Related Environmental Sciences | Geovetenskap och miljövetenskap

Earth Sciences | Horizontal and vertical mass contrasts | Polyhedral body | Geophysics/Geodesy | Earth Sciences, general | Singularity-free | Prism | Astronomy, Observations and Techniques | Gravity | OPTIMUM EXPRESSION | LINEARLY VARYING DENSITY | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | GRAVITATIONAL ATTRACTION | JOINT INVERSION | GEOCHEMISTRY & GEOPHYSICS | UNSTRUCTURED GRIDS | RIGHT RECTANGULAR PRISM | AIRBORNE GRAVITY | MINERAL EXPLORATION | Sedimentary basins | Analysis | Polyhedra | 3-D technology | Geophysics | Gravity anomalies | Gravitation | Mathematical analysis | Exact solutions | Gravitational fields | Mathematical models | Polynomials | Density | Naturvetenskap | Geofysik | Natural Sciences | Earth and Related Environmental Sciences | Geovetenskap och miljövetenskap

Journal Article

Celestial Mechanics and Dynamical Astronomy, ISSN 0923-2958, 12/2014, Volume 120, Issue 4, pp. 349 - 372

We extend a recent approach for computing the gravity effects of polyhedral bodies with uniform density by the case of bodies with linearly varying density and...

Eros | Gravitational potential | Gradient | Polyhedra | Astrophysics and Astroparticles | Singularities | Mechanics | Geophysics/Geodesy | Dynamical Systems and Ergodic Theory | Aerospace Technology and Astronautics | Physics | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | FIELD | GRAVITATIONAL ATTRACTION | ALGORITHM | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | ASTRONOMY & ASTROPHYSICS | RECTANGULAR PRISM | BODY | Specific gravity | Asteroids | Gravity | Density | Gravitation | Computation | Mathematical analysis | Derivatives | Vectors (mathematics) | Astronomy

Eros | Gravitational potential | Gradient | Polyhedra | Astrophysics and Astroparticles | Singularities | Mechanics | Geophysics/Geodesy | Dynamical Systems and Ergodic Theory | Aerospace Technology and Astronautics | Physics | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | FIELD | GRAVITATIONAL ATTRACTION | ALGORITHM | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | ASTRONOMY & ASTROPHYSICS | RECTANGULAR PRISM | BODY | Specific gravity | Asteroids | Gravity | Density | Gravitation | Computation | Mathematical analysis | Derivatives | Vectors (mathematics) | Astronomy

Journal Article

Surveys in Geophysics, ISSN 0169-3298, 03/2019, Volume 40, Issue 2, pp. 197 - 246

We provide the spherical harmonic solutions to evaluate the external gravitational field of a general polyhedral body with arbitrary polynomial density...

Polyhedral bodies | Gravitational field | Polynomial density contrast | Spherical harmonics | Numerical stability | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | GRAVITY-ANOMALIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | RECTANGULAR PRISM | BODIES | ATTRACTION | DERIVATIVES | Algorithms | Specific gravity | Analysis | Gravity | Gravity field | Theorems | Divergence | Polyhedra | Methodology | Remote observing | Coefficients | Density | Solutions | Asteroids | Polynomials | Mathematical models | Numerical experiments | Gravitation | Stability | Gravitational fields | Derivatives | Tensors | Stokes theorem (vector calculus) | Computation | EROS asteroid | Tetrahedrons

Polyhedral bodies | Gravitational field | Polynomial density contrast | Spherical harmonics | Numerical stability | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | GRAVITY-ANOMALIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | RECTANGULAR PRISM | BODIES | ATTRACTION | DERIVATIVES | Algorithms | Specific gravity | Analysis | Gravity | Gravity field | Theorems | Divergence | Polyhedra | Methodology | Remote observing | Coefficients | Density | Solutions | Asteroids | Polynomials | Mathematical models | Numerical experiments | Gravitation | Stability | Gravitational fields | Derivatives | Tensors | Stokes theorem (vector calculus) | Computation | EROS asteroid | Tetrahedrons

Journal Article

Celestial Mechanics and Dynamical Astronomy, ISSN 0923-2958, 2/2019, Volume 131, Issue 2, pp. 1 - 28

The gravitational potential and its derivatives of a polyhedral body with linearly varying density can be expressed as closed analytical expressions in terms...

Polyhedron | Gravitational potential | Stability | Astrophysics and Astroparticles | Spherical harmonics | Classical Mechanics | Geophysics/Geodesy | Normalization | Dynamical Systems and Ergodic Theory | Aerospace Technology and Astronautics | Physics | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | ANOMALIES | GRAVITATIONAL ATTRACTION | GRAVITY-FIELD | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | ASTRONOMY & ASTROPHYSICS | RECTANGULAR PRISM | ANALYTICAL EXPRESSIONS | BODIES | Asteroids | Analysis | Algorithms | Theorems | Divergence | Stokes theorem (vector calculus) | EROS asteroid | Prisms | Polynomials | Numerical experiments | Coefficients | Density

Polyhedron | Gravitational potential | Stability | Astrophysics and Astroparticles | Spherical harmonics | Classical Mechanics | Geophysics/Geodesy | Normalization | Dynamical Systems and Ergodic Theory | Aerospace Technology and Astronautics | Physics | OPTIMUM EXPRESSION | HOMOGENEOUS POLYHEDRON | ANALYTICAL COMPUTATION | ANOMALIES | GRAVITATIONAL ATTRACTION | GRAVITY-FIELD | MATHEMATICS, INTERDISCIPLINARY APPLICATIONS | ASTRONOMY & ASTROPHYSICS | RECTANGULAR PRISM | ANALYTICAL EXPRESSIONS | BODIES | Asteroids | Analysis | Algorithms | Theorems | Divergence | Stokes theorem (vector calculus) | EROS asteroid | Prisms | Polynomials | Numerical experiments | Coefficients | Density

Journal Article

Journal of Applied Physics, ISSN 0021-8979, 03/2017, Volume 121, Issue 12, p. 125102

An analytical solution in a closed form is obtained for the three-dimensional elastic strain distribution in an unlimited medium containing an inclusion with a...

TRANSFORMATION STRAIN | HOMOGENEOUS POLYHEDRON | POLYGONAL INCLUSION | PHYSICS, APPLIED | PYRAMIDAL QUANTUM DOTS | GRAVITATIONAL ATTRACTION | ANISOTROPIC ELLIPSOIDAL INCLUSION | PIEZOELECTRIC FIELDS | STRESS-FIELD | RIGHT RECTANGULAR PRISM | ELECTRONIC-STRUCTURE | Polyhedra | Chemical properties | Research | Lattice dynamics | Electrostatic apparatus and appliances

TRANSFORMATION STRAIN | HOMOGENEOUS POLYHEDRON | POLYGONAL INCLUSION | PHYSICS, APPLIED | PYRAMIDAL QUANTUM DOTS | GRAVITATIONAL ATTRACTION | ANISOTROPIC ELLIPSOIDAL INCLUSION | PIEZOELECTRIC FIELDS | STRESS-FIELD | RIGHT RECTANGULAR PRISM | ELECTRONIC-STRUCTURE | Polyhedra | Chemical properties | Research | Lattice dynamics | Electrostatic apparatus and appliances

Journal Article

Journal of Geodesy, ISSN 0949-7714, 3/2015, Volume 89, Issue 3, pp. 199 - 215

We address the evaluation of the potential and of the gravitational attraction of mass distributions, assigned by means of a Digital Terrain Model (DTM), for...

Linear and bilinear prism | Earth Sciences | Gravitational potential | Digital terrain model | Polyhedral modeling | Gravitational attraction | Geophysics/Geodesy | Earth Sciences, general | OPTIMUM EXPRESSION | GEOCHEMISTRY & GEOPHYSICS | REMOTE SENSING | GRAVITY-FIELD | HOMOGENEOUS POLYHEDRAL BODIES | Comparative analysis | Gravity | Geography | Studies | Topography | Analysis | Approximations

Linear and bilinear prism | Earth Sciences | Gravitational potential | Digital terrain model | Polyhedral modeling | Gravitational attraction | Geophysics/Geodesy | Earth Sciences, general | OPTIMUM EXPRESSION | GEOCHEMISTRY & GEOPHYSICS | REMOTE SENSING | GRAVITY-FIELD | HOMOGENEOUS POLYHEDRAL BODIES | Comparative analysis | Gravity | Geography | Studies | Topography | Analysis | Approximations

Journal Article

GEOPHYSICS, ISSN 0016-8033, 11/2019, Volume 84, Issue 6, pp. G93 - G112

As an alternative to the popular rectangular parallelepiped model, we have developed a novel 3D analytical forward-problem solution for the gravity gradient...

GEOCHEMISTRY & GEOPHYSICS | EXPRESSIONS | GRAVIMAGNETIC ANOMALY FORMULAS | SEDIMENTARY BASINS | FIELD | GRAVITATIONAL ATTRACTION | GODAVARI VALLEY | COMPUTATION | HOMOGENEOUS POLYHEDRAL BODIES | CHINTALAPUDI SUBBASIN | INVERSION

GEOCHEMISTRY & GEOPHYSICS | EXPRESSIONS | GRAVIMAGNETIC ANOMALY FORMULAS | SEDIMENTARY BASINS | FIELD | GRAVITATIONAL ATTRACTION | GODAVARI VALLEY | COMPUTATION | HOMOGENEOUS POLYHEDRAL BODIES | CHINTALAPUDI SUBBASIN | INVERSION

Journal Article

The Journal of Chemical Physics, ISSN 0021-9606, 12/2016, Volume 145, Issue 21, p. 211903

The phase behavior and the homogeneous nucleation of an equimolar mixture of octahedra and cuboctahedra are studied using thermodynamic integration,...

HOMOGENEOUS CRYSTAL NUCLEATION | MOLECULAR SIMULATION | HARD-SPHERE MIXTURES | PARTICLES | PHASE-BEHAVIOR | BUILDING-BLOCKS | DNA | PHYSICS, ATOMIC, MOLECULAR & CHEMICAL | CHEMISTRY, PHYSICAL | NANOPARTICLE SUPERLATTICES | COMPLEX STRUCTURES | COLLOIDAL CRYSTALS | Nucleation | Computer simulation | Metastable state | Variations | Supersaturation | Filling | Crystal structure | Long range order | THERMODYNAMICS | METASTABLE STATES | CESIUM CHLORIDES | INORGANIC, ORGANIC, PHYSICAL AND ANALYTICAL CHEMISTRY | CRYSTAL STRUCTURE | NUCLEATION | INTERACTIONS | FREE ENERGY

HOMOGENEOUS CRYSTAL NUCLEATION | MOLECULAR SIMULATION | HARD-SPHERE MIXTURES | PARTICLES | PHASE-BEHAVIOR | BUILDING-BLOCKS | DNA | PHYSICS, ATOMIC, MOLECULAR & CHEMICAL | CHEMISTRY, PHYSICAL | NANOPARTICLE SUPERLATTICES | COMPLEX STRUCTURES | COLLOIDAL CRYSTALS | Nucleation | Computer simulation | Metastable state | Variations | Supersaturation | Filling | Crystal structure | Long range order | THERMODYNAMICS | METASTABLE STATES | CESIUM CHLORIDES | INORGANIC, ORGANIC, PHYSICAL AND ANALYTICAL CHEMISTRY | CRYSTAL STRUCTURE | NUCLEATION | INTERACTIONS | FREE ENERGY

Journal Article

GEOPHYSICAL JOURNAL INTERNATIONAL, ISSN 0956-540X, 06/2019, Volume 217, Issue 3, pp. 1577 - 1601

A study is presented using a mesh-free approach and a radial basis function generated finite difference (RBF-FD) method for numerically modelling 3-D gravity...

OPTIMUM EXPRESSION | Gravity anomalies and Earth structure | ANALYTICAL COMPUTATION | DATA INCORPORATING TOPOGRAPHY | GRAVITATIONAL ATTRACTION | DATA APPROXIMATION SCHEME | HOMOGENEOUS POLYHEDRAL BODIES | Numerical modelling | GEOCHEMISTRY & GEOPHYSICS | OPTIMAL SHAPE-PARAMETERS | 3-D INVERSION | FINITE-ELEMENT-METHOD | STABLE COMPUTATION

OPTIMUM EXPRESSION | Gravity anomalies and Earth structure | ANALYTICAL COMPUTATION | DATA INCORPORATING TOPOGRAPHY | GRAVITATIONAL ATTRACTION | DATA APPROXIMATION SCHEME | HOMOGENEOUS POLYHEDRAL BODIES | Numerical modelling | GEOCHEMISTRY & GEOPHYSICS | OPTIMAL SHAPE-PARAMETERS | 3-D INVERSION | FINITE-ELEMENT-METHOD | STABLE COMPUTATION

Journal Article

Astronomical Journal, ISSN 0004-6256, 10/2017, Volume 154, Issue 4, p. 145

In order to obtain the gravitational field of a general finite body inside its Brillouin sphere, we developed a new method to compute the field accurately....

gravitation | celestial mechanics | minor planets, asteroids: individual (433 Eros) | minor planets | NUMERICAL COMPUTATION | COMET 67P/CHURYUMOV-GERASIMENKO | asteroids: individual | HOMOGENEOUS POLYHEDRAL BODIES | DUMBBELL-SHAPED BODY | PERIODIC-ORBITS | SURFACE GRAVITY FIELDS | ASTRONOMY & ASTROPHYSICS | AXISYMMETRICAL OBJECTS | RIGHT RECTANGULAR PRISM | GAUSS-LEGENDRE QUADRATURE | FLOATING-POINT NUMBERS | Transcendental functions | Computer programming | MacLaurin series | Gravitation | Spherical harmonics | Digits | Coordinates | Polyhedrons | Gravitational fields | Spherical coordinates | Mathematical analysis | Integrals | Asteroids | Polar coordinates | EROS asteroid | Homogeneity | Mathematical models | Numerical experiments | Acceleration | Quadratures | PLANETS | APPROXIMATIONS | EVALUATION | QUADRATURES | ASTEROIDS | GRAVITATIONAL FIELDS | LAYERS | ACCELERATION | INTEGRALS | ASTROPHYSICS, COSMOLOGY AND ASTRONOMY | MASS | SPHERICAL HARMONICS | COORDINATES | EFFICIENCY | SURFACES

gravitation | celestial mechanics | minor planets, asteroids: individual (433 Eros) | minor planets | NUMERICAL COMPUTATION | COMET 67P/CHURYUMOV-GERASIMENKO | asteroids: individual | HOMOGENEOUS POLYHEDRAL BODIES | DUMBBELL-SHAPED BODY | PERIODIC-ORBITS | SURFACE GRAVITY FIELDS | ASTRONOMY & ASTROPHYSICS | AXISYMMETRICAL OBJECTS | RIGHT RECTANGULAR PRISM | GAUSS-LEGENDRE QUADRATURE | FLOATING-POINT NUMBERS | Transcendental functions | Computer programming | MacLaurin series | Gravitation | Spherical harmonics | Digits | Coordinates | Polyhedrons | Gravitational fields | Spherical coordinates | Mathematical analysis | Integrals | Asteroids | Polar coordinates | EROS asteroid | Homogeneity | Mathematical models | Numerical experiments | Acceleration | Quadratures | PLANETS | APPROXIMATIONS | EVALUATION | QUADRATURES | ASTEROIDS | GRAVITATIONAL FIELDS | LAYERS | ACCELERATION | INTEGRALS | ASTROPHYSICS, COSMOLOGY AND ASTRONOMY | MASS | SPHERICAL HARMONICS | COORDINATES | EFFICIENCY | SURFACES

Journal Article

Surveys in Geophysics, ISSN 0169-3298, 05/2015, Volume 36, Issue 3, pp. 391 - 425

An analytical solution is presented for the gravity anomaly produced by a 2D body whose geometrical shape is arbitrary and where the density contrast is a...

Gravity anomaly | Singularity | Polynomial density contrast | 2D bodies | OPTIMUM EXPRESSION | ANALYTICAL COMPUTATION | LINE INTEGRALS | GRAVITATIONAL ATTRACTION | HOMOGENEOUS POLYHEDRAL BODIES | 2-DIMENSIONAL BODIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | BASEMENT RELIEF | RECTANGULAR PRISM | MAGNETIC-ANOMALIES | Specific gravity | Analysis | Gravity | Polynomials | Density | Geophysics | Gravity anomalies | Approximation | Mathematical analysis | Paper | Mathematical models | Two dimensional | Polygons

Gravity anomaly | Singularity | Polynomial density contrast | 2D bodies | OPTIMUM EXPRESSION | ANALYTICAL COMPUTATION | LINE INTEGRALS | GRAVITATIONAL ATTRACTION | HOMOGENEOUS POLYHEDRAL BODIES | 2-DIMENSIONAL BODIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | BASEMENT RELIEF | RECTANGULAR PRISM | MAGNETIC-ANOMALIES | Specific gravity | Analysis | Gravity | Polynomials | Density | Geophysics | Gravity anomalies | Approximation | Mathematical analysis | Paper | Mathematical models | Two dimensional | Polygons

Journal Article

Surveys in Geophysics, ISSN 0169-3298, 9/2019, Volume 40, Issue 5, pp. 1151 - 1183

In this paper, analytical solutions are presented for the gravity vector and gravity gradient tensor at any point produced by a 2D body whose cross-section is...

Gravity gradient tensor | Singularity | Earth Sciences | Gravity vector | 2D polygonal body | Geophysics/Geodesy | Earth Sciences, general | Polynomial density contrast | Astronomy, Observations and Techniques | LINE INTEGRALS | FIELD | GRAVITATIONAL ATTRACTION | HOMOGENEOUS POLYHEDRAL BODIES | 2-DIMENSIONAL BODIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | RECTANGULAR PRISM | ANALYTICAL EXPRESSIONS | DEPTH | MAGNETIC-ANOMALIES | Specific gravity | Gravity | Gravitation | Two dimensional bodies | Stability | Exact solutions | Product design | Stability analysis | Density | Sums | Polygons | Tensors | Gravitational effects | Apexes | Computer applications | Gravity effects | Polynomials | Numerical stability

Gravity gradient tensor | Singularity | Earth Sciences | Gravity vector | 2D polygonal body | Geophysics/Geodesy | Earth Sciences, general | Polynomial density contrast | Astronomy, Observations and Techniques | LINE INTEGRALS | FIELD | GRAVITATIONAL ATTRACTION | HOMOGENEOUS POLYHEDRAL BODIES | 2-DIMENSIONAL BODIES | GEOCHEMISTRY & GEOPHYSICS | SEDIMENTARY BASINS | RECTANGULAR PRISM | ANALYTICAL EXPRESSIONS | DEPTH | MAGNETIC-ANOMALIES | Specific gravity | Gravity | Gravitation | Two dimensional bodies | Stability | Exact solutions | Product design | Stability analysis | Density | Sums | Polygons | Tensors | Gravitational effects | Apexes | Computer applications | Gravity effects | Polynomials | Numerical stability

Journal Article

Journal of Geodesy, ISSN 0949-7714, 4/2018, Volume 92, Issue 4, pp. 361 - 381

Beyond rectangular prism polyhedron, as a discrete volume element, can also be used to model the density distribution inside 3D geological structures. The...

Polyhedron | Earth Sciences | Error of gravity potential | Geophysics/Geodesy | Earth Sciences, general | DTM error | Forward gravitational modelling | Model generalization | Rectangular prism | LINE INTEGRALS | GRAVITY-FIELD | HOMOGENEOUS POLYHEDRAL BODIES | DENSITY | GEOCHEMISTRY & GEOPHYSICS | UNIFORM POLYHEDRA | REMOTE SENSING | GRAVIMAGNETIC ANOMALY FORMULAS | CORRECTION COMPUTATIONS | SURFACE | MAGNETIC-ANOMALIES | Algorithms | Analysis | Methods | Gravity | Gravity field | Gravitational fields | Geological structures | Data | Optimization | Errors | Computation | Volume | Geodetics | Coordinate systems | Modelling | Formulae | Mathematical models | Reliability

Polyhedron | Earth Sciences | Error of gravity potential | Geophysics/Geodesy | Earth Sciences, general | DTM error | Forward gravitational modelling | Model generalization | Rectangular prism | LINE INTEGRALS | GRAVITY-FIELD | HOMOGENEOUS POLYHEDRAL BODIES | DENSITY | GEOCHEMISTRY & GEOPHYSICS | UNIFORM POLYHEDRA | REMOTE SENSING | GRAVIMAGNETIC ANOMALY FORMULAS | CORRECTION COMPUTATIONS | SURFACE | MAGNETIC-ANOMALIES | Algorithms | Analysis | Methods | Gravity | Gravity field | Gravitational fields | Geological structures | Data | Optimization | Errors | Computation | Volume | Geodetics | Coordinate systems | Modelling | Formulae | Mathematical models | Reliability

Journal Article