Nearly-circular periodic solutions of perturbed relativistic Kepler problems: the fixed-period and the fixed-energy problems

Abstract

The paper studies the existence of periodic solutions of a perturbed relativistic Kepler problem of the type equation* ddt(mx1-|x|2/c2) = -αx|x|3 + \, ∇x U(t,x), x ∈ Rd\0\, equation* with d=2 or d=3, bifurcating, for small enough, from the set of circular solutions of the unperturbed system. Both the case of the fixed-period problem (assuming that U is T-periodic in time) and the case of the fixed-energy problem (assuming that U is independent of time) are considered.

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