Hénon, Michel.
Generating Families in the Restricted Three-Body Problem II. Quantitative Study of Bifurcations / [electronic resource] : by Michel Hénon. - Berlin, Heidelberg : Springer Berlin Heidelberg, 2001. - XII, 304 p. online resource. - Lecture Notes in Physics Monographs, 65 0940-7677 ; . - Lecture Notes in Physics Monographs, 65 .
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.
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 numerically. This is the second volume of an attempt to explain and organize the material through a systematic study of generating families, the limits of families of periodic orbits when the mass ratio of the two main bodies becomes vanishingly small. We use quantitative analysis in the vicinity of bifurcations of types 1 and 2. In most cases the junctions between branches can now be determined. A first-order approximation of families of periodic orbits in the vicinity of a bifurcation is also obtained. This book is intended for scientists and students interested in the restricted problem, in its applications to astronomy and space research, and in the theory of dynamical systems.
9783540447122
10.1007/3-540-44712-1 doi
Physics.
Computer science--Mathematics.
Astronomy.
Astrophysics.
Engineering.
Physics.
Astronomy.
Complexity.
Computational Mathematics and Numerical Analysis.
Extraterrestrial Physics, Space Sciences.
QB4
520
Generating Families in the Restricted Three-Body Problem II. Quantitative Study of Bifurcations / [electronic resource] : by Michel Hénon. - Berlin, Heidelberg : Springer Berlin Heidelberg, 2001. - XII, 304 p. online resource. - Lecture Notes in Physics Monographs, 65 0940-7677 ; . - Lecture Notes in Physics Monographs, 65 .
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.
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 numerically. This is the second volume of an attempt to explain and organize the material through a systematic study of generating families, the limits of families of periodic orbits when the mass ratio of the two main bodies becomes vanishingly small. We use quantitative analysis in the vicinity of bifurcations of types 1 and 2. In most cases the junctions between branches can now be determined. A first-order approximation of families of periodic orbits in the vicinity of a bifurcation is also obtained. This book is intended for scientists and students interested in the restricted problem, in its applications to astronomy and space research, and in the theory of dynamical systems.
9783540447122
10.1007/3-540-44712-1 doi
Physics.
Computer science--Mathematics.
Astronomy.
Astrophysics.
Engineering.
Physics.
Astronomy.
Complexity.
Computational Mathematics and Numerical Analysis.
Extraterrestrial Physics, Space Sciences.
QB4
520