Richard Moeckel
Affiliations: | University of Minnesota, Twin Cities, Minneapolis, MN |
Area:
Mathematics, Astronomy and AstrophysicsGoogle:
"Richard Moeckel"Mean distance: 21.5
Parents
Sign in to add mentor| Charles Cameron Conley | grad student | 1980 | UW Madison (MathTree) | |
| (Orbits Near Triple Collision in the Three-body Problem.) | ||||
Children
Sign in to add trainee| Kuo-Chang Chen | grad student | 2001 | UMN |
| Eduardo S. Goes Leandro | grad student | 2001 | UMN |
| Hsin-Yuan Huang | grad student | 2011 | UMN |
| Ya-lun Tsai | grad student | 2011 | UMN |
| Guowei Yu | grad student | 2013 | UMN |
| Nai-Chia Chen | grad student | 2014 | UMN |
| Alanna Hoyer-Leitzel | grad student | 2014 | UMN |
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Publications
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| Moeckel R. (2020) Minimal Geodesics of the Isosceles Three Body Problem Qualitative Theory of Dynamical Systems. 19: 1-29 |
| Duignan N, Moeckel R, Montgomery R, et al. (2020) Chazy-Type Asymptotics and Hyperbolic Scattering for the $n$-Body Problem Archive For Rational Mechanics and Analysis. 238: 255-297 |
| Moeckel R. (2018) Counting relative equilibrium configurations of the full two-body problem Celestial Mechanics and Dynamical Astronomy. 130: 17 |
| Moeckel R. (2017) Minimal energy configurations of gravitationally interacting rigid bodies Celestial Mechanics and Dynamical Astronomy. 128: 3-18 |
| Corbera M, Cors J, Llibre J, et al. (2015) Bifurcation of relative equilibria of the (1+3)-body problem Siam Journal On Mathematical Analysis. 47: 1377-1404 |
| Moeckel R, Montgomery R. (2015) Realizing all reduced syzygy sequences in the planar three-body problem Nonlinearity. 28: 1919-1935 |
| Moeckel R, Montgomery R. (2013) Symmetric regularization, reduction and blow-up of the planar three-body problem Pacific Journal of Mathematics. 262: 129-189 |
| Legoll F, Luskin M, Moeckel R. (2009) Non-ergodicity of nosé-hoover dynamics Nonlinearity. 22: 1673-1694 |
| Moeckel R. (2009) Shooting for the eight: A topological existence proof for a figure-eight orbit of the three-body problem Differential Equations: Geometry, Symmetries and Integrability - the Abel Symposium 2008, Proceedings of the 5th Abel Symposium. 287-310 |
| Hampton M, Moeckel R. (2009) Finiteness of stationary configurations of the four-vortex problem Transactions of the American Mathematical Society. 361: 1317-1332 |