The Restless Universe Applications of Gravitational N-Body Dynamics to Planetary Stellar and Galactic SystemsThe Restless Universe: Applications of Gravitational N-Body Dynamics to Planetary Stellar and Galactic Systems stimulates the cross-fertilization of ideas, methods, and applications among the different communities who work in the gravitational N-body problem arena, across diverse fields of astrophysics. The chapters and topics cover three broad the |
Contents
Solar system dynamics | |
clusters | |
Ideal resonance and Melnikovs theorem | |
David Vokrouhlicky | |
Stellar kinematics and dynamics | |
Escape in Hills problem | |
Galactic dynamics | |
Nonintegrable galactic dynamics | |
past present and future | 1994 |
Gravitational Nbody simulation of largescale cosmic structure | 2004 |
General dynamics | 2035 |
Central configurations revisited | 2055 |
Bonnie A Steves and Archie E | 2092 |
Claude Froeschlé Massimiliano Guzzo and Elena Lega | 2106 |
Alessandra Celletti Claude Froeschlé Igor V Tetko and Alessandro E P Villa | 2127 |
2151 | |
Evolution of galaxies due to selfexcitation | 12 |
Cosmology Large scale structure dynamics | 16 |
Other editions - View all
The Restless Universe Applications of Gravitational N-Body Dynamics to ... Bonnie Steves Limited preview - 2019 |
The Restless Universe Applications of Gravitational N-Body Dynamics to ... Bonnie Steves Limited preview - 2019 |
Common terms and phrases
Aarseth algorithm approximation asteroid belt asteroids Astron behaviour binary body problem celestial central configurations chaotic choreographies cluster codes coefficients collision collisionless component computed consider constant coordinates corresponding curves dark matter defined density differential equations disk distance distribution dynamics eccentricity elliptical elliptical galaxies energy equations of motion escape eulerian evolution example expansion exponents Farinella Figure fluid frequencies Froeschlé function galactic galaxy gravitational grid halo Hamiltonian system Henri Poincaré Hill’s initial conditions instability integral iterative linear Lyapunov Lyapunov exponents mass method MNRAS N-body simulations numerical observed obtained orbits parameters particles peculiar velocity perturbation phase space physical plane planetesimal Poincaré points polynomial potential properties radial real motion redshift surveys region resonance rotation scale Section secular resonances semimajor axis solar system solution stable stars stellar structure surface techniques theorem theory transformation Trojan Trojan asteroids Universe variables variational equations vector Vokrouhlický Yarkovsky effect Ziglin