Mathematics – Dynamical Systems
Scientific paper
Aug 1992
adsabs.harvard.edu/cgi-bin/nph-data_query?bibcode=1992asdy.conf.2241r&link_type=abstract
IN: Astrodynamics 1991; Proceedings of the AAS/AIAA Astrodynamics Conference, Durango, CO, Aug. 19-22, 1991. Pt. 3 (A92-43251 18
Mathematics
Dynamical Systems
Boundary Value Problems, Chebyshev Approximation, Dynamical Systems, Interpolation, Numerical Integration, Equations Of Motion, Iterative Solution, Position Errors
Scientific paper
A family of implicit methods based on intra-step Chebyshev interpolation has been developed to integrate initial value problems of the special second-order equations y-double prime = f(y;x). A new, variable-step Stoermer procedure is embedded to accelerate the iterative process required at off-nodal points. The resulting method has low computational overhead and maintains a very low rate of global error growth. Comparisons are made on numerical integrations of the rectangular, heliocentric equations of motion for the planets.
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