An Introduction to Common Numerical Integration Codes Used in Dynamical Astronomy

Autor(en)

Siegfried Eggl, Rudolf Dvorak

Abstrakt

As the tree of numerical methods used to solve ordinary differential equations develops more and more branches, it may, despite great literature, become hard to find out which properties should be aimed for, given certain problems in celestial mechanics. With this chapter the authors intend to give an introduction to common, symplectic, and non-symplectic algorithms used to numerically solve the basic Newtonian gravitational N-body problem in dynamical astronomy. Six methods are being presented, including a Cash–Karp Runge–Kutta, Radau15, Lie Series, Bulirsch-Stoer, Candy, and a symplectic Hybrid integrator of Mon. Not.R. Astro. Soc. 304: 793–799,?]. Their main properties, as for example, the handling of conserved quantities, will be discussed on the basis of the Kepler problem.

Organisation(en)

Institut für Astrophysik

Seiten

431-480

Anzahl der Seiten

50

DOI

https://doi.org/10.1007/978-3-642-04458-8_9

Publikationsdatum

2010

Peer-reviewed

Ja

ÖFOS 2012

103003 Astronomie

Link zum Portal

https://ucrisportal.univie.ac.at/de/publications/95863df9-0d6a-4e84-983c-98a6df03cfa8