Mutual gravitational potential, force, and torque of a homogeneous polyhedron and an extended body: an application to binary asteroids
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Publication:1684369
DOI10.1007/S10569-017-9776-6zbMath1479.70077OpenAlexW2740916156MaRDI QIDQ1684369
Publication date: 8 December 2017
Published in: Celestial Mechanics and Dynamical Astronomy (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10569-017-9776-6
binary asteroidsextended rigid bodyfull two-body problemgravitationally coupled orbit-attitude motionhomogeneous polyhedronmutual gravitational potential
Related Items (4)
Accelerating binary asteroid system propagation via nested interpolation method ⋮ Extended two-body problem for rotating rigid bodies ⋮ A finite element method for computational full two-body problem. I: The mutual potential and derivatives over bilinear tetrahedron elements ⋮ The planar two-body problem for spheroids and disks
Cites Work
- Unnamed Item
- Hamiltonian structures of dynamics of a gyrostat in a gravitational field
- The two-body interaction potential in the STF tensor formalism: an application to binary asteroids
- Mutual potential of homogeneous polyhedra
- Relative equilibria for general gravity fields in the sphere-restricted full 2-body problem
- The Newtonian potential of homogeneous polyhedra
- The Newtonian potential of a homogeneous cube
- The gravitational potential of a homogeneous polyhedron or don't cut corners
- Reduction, relative equilibria and potential in the two rigid bodies problem
- Exterior gravitation of a polyhedron derived and compared with harmonic and mascon gravitation representations of asteroid 4769 Castalia
- Mutual potential between two rigid bodies with arbitrary shapes and mass distributions
- Stability in the full two-body problem
- Figure-figure interaction between bodies having arbitrary shapes and mass distributions: a power series expansion approach
- Stability of the planar full 2-body problem
- Mutual gravitational potential and torque of solid bodies via inertia integrals
- Energy and stability in the full two body problem
- The mutual potential and gravitational torques of two bodies to fourth order
- Mutual gravitational potential ofN solid bodies
- Motion of a space station. I
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