Periodic solutions to a forced Kepler problem in the plane

Abstract

Given a smooth function U(t,x), T-periodic in the first variable and satisfying U(t,x) = O( x α) for some α ∈ (0,2) as x ∞, we prove that the forced Kepler problem x = - x|x|3 + ∇x U(t,x), x∈ R2, has a generalized T-periodic solution, according to the definition given in the paper [Boscaggin, Ortega, Zhao, Periodic solutions and regularization of a Kepler problem with time-dependent perturbation, Trans. Amer. Math. Soc, 2018]. The proof relies on variational arguments.