We study the necessary and sufficient conditions on the masses for the periodic solution of planar 4-body problems, where three particles locate at the vertices of an equilateral triangle and rotate with constant angular velocity about a resting particle. We prove that the above periodic motion is a solution of Newtonian 4-body problems if and only if the resting particle is at the origin and the masses of the other three particles are equal and their angular velocity satisfies a special condition
In this paper we give a complete description of the families of central configurations of the planar...
In this paper, we apply the variational method with Structural Prescribed Boundary Conditions (SPBC)...
We prove existence and multiplicity of T-periodic solutions (for any given T) for the N-body problem...
Using a variational method, we exhibit a surprisingly simple periodic orbit for the newtonian proble...
Analytical methods are used to prove the existence of a periodic, symmetric solution with singularit...
AbstractThis paper proves the existence of six new classes of periodic solutions to the N-body probl...
In this paper we prove the existence of a new periodic solution for the planar Newtonian four-body p...
AbstractUsing the method of analytic continuation in an equivariant differential geometric setting, ...
Based on the works of Perko and Walter, Moeckel and Simo, and Zhang and Zhou, we study the necessary...
We prove existence and multiplicity of T-periodic solutions (for any given T) for the N-body problem...
We consider the question of finding a periodic solution for the planar Newtonian N-body problem with...
AbstractThe Newtonian N-body problem admits uniformly rotating relative equilibrium solutions in the...
We prove the existence of a number of smooth periodic motions u(*) of the classical Newtonian N-body...
AbstractTake any nonresonant relative equilibrium solution of the N-body problem. Then there is a pe...
For the Newtonian 4-body problem in space we prove that any zero angular momentum bounded solution s...
In this paper we give a complete description of the families of central configurations of the planar...
In this paper, we apply the variational method with Structural Prescribed Boundary Conditions (SPBC)...
We prove existence and multiplicity of T-periodic solutions (for any given T) for the N-body problem...
Using a variational method, we exhibit a surprisingly simple periodic orbit for the newtonian proble...
Analytical methods are used to prove the existence of a periodic, symmetric solution with singularit...
AbstractThis paper proves the existence of six new classes of periodic solutions to the N-body probl...
In this paper we prove the existence of a new periodic solution for the planar Newtonian four-body p...
AbstractUsing the method of analytic continuation in an equivariant differential geometric setting, ...
Based on the works of Perko and Walter, Moeckel and Simo, and Zhang and Zhou, we study the necessary...
We prove existence and multiplicity of T-periodic solutions (for any given T) for the N-body problem...
We consider the question of finding a periodic solution for the planar Newtonian N-body problem with...
AbstractThe Newtonian N-body problem admits uniformly rotating relative equilibrium solutions in the...
We prove the existence of a number of smooth periodic motions u(*) of the classical Newtonian N-body...
AbstractTake any nonresonant relative equilibrium solution of the N-body problem. Then there is a pe...
For the Newtonian 4-body problem in space we prove that any zero angular momentum bounded solution s...
In this paper we give a complete description of the families of central configurations of the planar...
In this paper, we apply the variational method with Structural Prescribed Boundary Conditions (SPBC)...
We prove existence and multiplicity of T-periodic solutions (for any given T) for the N-body problem...