The stability of relative equilibrium solutions for the interaction of two massive bodies is explored. We restrict ourselves to the interaction between an ellipsoid and a sphere, both with finite mass. The study of this problem has application to modeling the relative dynamics of binary asteroids, the motion of spacecraft about small bodies, and the dynamics of gravity gradient satellites. The relative equilibrium can be parameterized by a few constants, including the mass ratio of the two bodies, the shape of the ellipsoid, and the normalized distance between the two bodies. Planar stability is characterized over this range of parameter values. When restricted to motion in the symmetry plane, the dynamical problem can be reduced to a two-d...
For a large class of concrete astronomical situations, the motion of celestial bodies is modelled by...
The n-body problem models a system of n-point masses that attract each other via some binary interac...
We classify and analyze the stability of all relative equilibria for the two-body problem in the hyp...
: The stability of relative equilibrium solutions for the interaction of two massive bodies is explo...
Equilibrium conditions for a mutually attracting general mass distribution and point mass are stated...
Stability conditions are established in the problem of two gravitationally interacting rigid bodies,...
AbstractIn this paper, we study symmetry reduction for a binary asteroid system modeled by a rigid b...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/76569/1/AIAA-30937-245.pd
A dumbbell-shaped rigid body can be used to represent certain large spacecraft or asteroids with bim...
We examine relative equilibria of a rigid body free to rotate about its center of mass which is cons...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/77368/1/AIAA-10546-792.pd
We consider the two-body problem on surfaces of constant non-zero curvature and classify the relativ...
The geometric mechanics of a pair of asteroids in orbit about each other under mutual gravitational ...
We study a simple model for an asteroid pair, namely a planar system consisting of a rigid body and ...
We study spacecraft motion near a binary asteroid by means of theoretical and computational tools fr...
For a large class of concrete astronomical situations, the motion of celestial bodies is modelled by...
The n-body problem models a system of n-point masses that attract each other via some binary interac...
We classify and analyze the stability of all relative equilibria for the two-body problem in the hyp...
: The stability of relative equilibrium solutions for the interaction of two massive bodies is explo...
Equilibrium conditions for a mutually attracting general mass distribution and point mass are stated...
Stability conditions are established in the problem of two gravitationally interacting rigid bodies,...
AbstractIn this paper, we study symmetry reduction for a binary asteroid system modeled by a rigid b...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/76569/1/AIAA-30937-245.pd
A dumbbell-shaped rigid body can be used to represent certain large spacecraft or asteroids with bim...
We examine relative equilibria of a rigid body free to rotate about its center of mass which is cons...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/77368/1/AIAA-10546-792.pd
We consider the two-body problem on surfaces of constant non-zero curvature and classify the relativ...
The geometric mechanics of a pair of asteroids in orbit about each other under mutual gravitational ...
We study a simple model for an asteroid pair, namely a planar system consisting of a rigid body and ...
We study spacecraft motion near a binary asteroid by means of theoretical and computational tools fr...
For a large class of concrete astronomical situations, the motion of celestial bodies is modelled by...
The n-body problem models a system of n-point masses that attract each other via some binary interac...
We classify and analyze the stability of all relative equilibria for the two-body problem in the hyp...