We consider periodic perturbations of a central force field having a rotational symmetry, and prove the existence of nearly circular periodic orbits. We thus generalize, in the planar case, some previous bifurcation results obtained by Ambrosetti and Coti Zelati. Our results apply, in particular, to the classical Kepler problem
AbstractFor pendulum-like equations, perturbation-type arguments and topological tools provide the e...
Within a given range of energy levels the two fixed centers problem under a variational gravitationa...
Agraïments: The third author is partially supported by FCT/Portugal through UID/MAT/04459/2013.We an...
We consider periodic perturbations of a central force field having a rotational symmetry, and prove ...
The classical Newton equation for the motion of a body in a gravitational central field is here modi...
We consider radial periodic perturbations of a central force field and prove the existence of rotati...
AbstractWe are concerned with non-autonomous radially symmetric systems with a singularity, which ar...
AbstractWe show the existence of periodic solutions for continuous symmetric perturbations of certai...
Agraïments: The second author of this work was partially supported by Fundación Séneca de la Región ...
In this work we analyze the existence and stability of periodic solutions to a Hamiltonian vector fi...
Abstract In this paper, we consider a time-periodically forced Kepler problem in any dimens...
Many generalizations of the Kepler problem with homogeneous potential of degree -1/2 have been consi...
We show how to apply to Hamiltonian differential systems recent results for studying the periodic or...
We apply Reeb’s theorem to prove the existence of periodic orbits in the rotating Hénon– Heiles sys...
We consider a Kepler problem, with an additional rotating external force, and study the existence of...
AbstractFor pendulum-like equations, perturbation-type arguments and topological tools provide the e...
Within a given range of energy levels the two fixed centers problem under a variational gravitationa...
Agraïments: The third author is partially supported by FCT/Portugal through UID/MAT/04459/2013.We an...
We consider periodic perturbations of a central force field having a rotational symmetry, and prove ...
The classical Newton equation for the motion of a body in a gravitational central field is here modi...
We consider radial periodic perturbations of a central force field and prove the existence of rotati...
AbstractWe are concerned with non-autonomous radially symmetric systems with a singularity, which ar...
AbstractWe show the existence of periodic solutions for continuous symmetric perturbations of certai...
Agraïments: The second author of this work was partially supported by Fundación Séneca de la Región ...
In this work we analyze the existence and stability of periodic solutions to a Hamiltonian vector fi...
Abstract In this paper, we consider a time-periodically forced Kepler problem in any dimens...
Many generalizations of the Kepler problem with homogeneous potential of degree -1/2 have been consi...
We show how to apply to Hamiltonian differential systems recent results for studying the periodic or...
We apply Reeb’s theorem to prove the existence of periodic orbits in the rotating Hénon– Heiles sys...
We consider a Kepler problem, with an additional rotating external force, and study the existence of...
AbstractFor pendulum-like equations, perturbation-type arguments and topological tools provide the e...
Within a given range of energy levels the two fixed centers problem under a variational gravitationa...
Agraïments: The third author is partially supported by FCT/Portugal through UID/MAT/04459/2013.We an...