Generating Families in the Restricted Three-Body Problem [E-Book] : II. Quantitative Study of Bifurcations / by Michel Hénon.
The classical restricted three-body problem is of fundamental importance because of its applications in astronomy and space navigation, and also as a simple model of a non-integrable Hamiltonian dynamical system. A central role is played by periodic orbits, of which many have been computed numerical...
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Full text |
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Personal Name(s): | Hénon, Michel, author |
Imprint: |
Berlin, Heidelberg :
Springer,
2001
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Physical Description: |
XII, 304 p. online resource. |
Note: |
englisch |
ISBN: |
9783540447122 |
DOI: |
10.1007/3-540-44712-1 |
Series Title: |
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Lecture Notes in Physics Monographs ;
65 |
Subject (LOC): |
- Definitions and General Equations
- Quantitative Study of Type 1
- Partial Bifurcation of Type 1
- Total Bifurcation of Type 1
- The Newton Approach
- Proving General Results
- Quantitative Study of Type 2
- The Case 1/3 v < 1/2
- Partial Transition 2.1
- Total Transition 2.1
- Partial Transition 2.2
- Total Transition 2.2
- Bifurcations 2T1 and 2P1.