We are concerned with non-autonomous radially symmetric systems with a singularity, which are T -periodic in time. By the use of topological degree theory, we prove the existence of large-amplitude periodic solutions whose minimal period is an integer multiple of T . Precise estimates are then given in the case of Keplerian-like systems, showing some resemblance between the orbits of those solutions and the circular orbits of the corresponding classical autonomous system.

Periodic orbits of radially symmetric Keplerian-like systems: a topological degree approach

FONDA, ALESSANDRO;TOADER R.
2008-01-01

Abstract

We are concerned with non-autonomous radially symmetric systems with a singularity, which are T -periodic in time. By the use of topological degree theory, we prove the existence of large-amplitude periodic solutions whose minimal period is an integer multiple of T . Precise estimates are then given in the case of Keplerian-like systems, showing some resemblance between the orbits of those solutions and the circular orbits of the corresponding classical autonomous system.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11368/1803360
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