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Fully numerical computation of heteroclinic connection families in the spatial three-body problem

Damennick B. Henry, Daniel J. Scheeres

2023Communications in Nonlinear Science and Numerical Simulation12 citationsDOIOpen Access PDF

Abstract

Heteroclinic connections in the spatial circular restricted three-body problem play an important role in astrodynamics. This paper presents a fully numerical methodology for the computation of the two-parameter families of connections that exist between families of invariant tori in the three-body problem. The computation of connections is presented as a two-point boundary value problem in which the initial and final states belong to unstable and stable manifolds of two respective normally hyperbolic invariant manifolds. A flow map torus computation procedure is modified to compute particular trajectories within these spaces, and a robust two-parameter continuation scheme is paired with a shooting technique to compute the entire connection family. Results are provided in the Sun-Earth and Earth-Moon representations of the spatial three-body problem. The Sun-Earth connection family works to verify the methodology with previously developed semi-analytical connection computation techniques. The Earth-Moon example demonstrates the methodology in a setting where fully numerical techniques are required to study the connection family.

Topics & Concepts

Connection (principal bundle)ComputationInvariant (physics)MathematicsTorusContinuationApplied mathematicsMathematical analysisMathematical optimizationGeometryComputer scienceAlgorithmProgramming languageMathematical physicsSpacecraft Dynamics and ControlAstro and Planetary ScienceStellar, planetary, and galactic studies
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