Geometric proof of strong stable/unstable manifolds with application to the restricted three body problem

Abstract: We present a method for establishing strong stable/unstable manifolds of fixed points for maps and ODEs. The method is based on cone conditions, suitably formulated to allow for application in computer assisted proofs. In the case of ODEs, assumptions follow from estimates on the vector field, and it is not necessary to integrate the system. We apply our method to the restricted three body problem and show that for a given choice of the mass parameter, there exists a homoclinic orbit along matching strong stab… Show more

Spatial periodic orbits in the equilateral circular restricted four-body problem: computer-assisted proofs of existence

Spatial periodic orbits in the equilateral circular restricted four-body problem: computer-assisted proofs of existence

Parameterization of Invariant Manifolds for Periodic Orbits (II): A Posteriori Analysis and Computer Assisted Error Bounds

Resonant tori, transport barriers, and chaos in a vector field with a Neimark–Sacker bifurcation