Richard Montgomery
Affiliations: | University of California, Santa Cruz, Santa Cruz, CA, United States |
Area:
MathematicsGoogle:
"Richard Montgomery"Children
Sign in to add traineeWilliam C. McCain | grad student | 2007 | UC Santa Cruz |
Vidya Swaminathan | grad student | 2009 | UC Santa Cruz |
Alex L. Castro | grad student | 2010 | UC Santa Cruz |
Wyatt Howard | grad student | 2013 | UC Santa Cruz |
Corey R. Shanbrom | grad student | 2013 | UC Santa Cruz |
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Publications
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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 |
Cheng J, Marugame T, Matveev VS, et al. (2019) Chains in CR geometry as geodesics of a Kropina metric Advances in Mathematics. 350: 973-999 |
Montgomery R. (2019) Oscillating about coplanarity in the 4 body problem Inventiones Mathematicae. 218: 113-144 |
Moeckel RB, Montgomery R, Morgado HS. (2018) Free time minimizers for the three-body problem Celestial Mechanics and Dynamical Astronomy. 130: 28 |
Montgomery R. (2017) The hyperbolic plane, three-body problems, and Mnëv’s universality theorem Regular & Chaotic Dynamics. 22: 688-699 |
Féjoz J, Knauf A, Montgomery R. (2017) Lagrangian relations and linear point billiards Nonlinearity. 30: 1326-1355 |
Jackman C, Montgomery R. (2016) No hyperbolic pants for the 4-body problem with strong potential Pacific Journal of Mathematics. 280: 401-410 |
Dullin HR, Montgomery R. (2016) Syzygies in the two center problem Nonlinearity. 29: 1212-1237 |
Montgomery R. (2015) The Three-Body Problem and the Shape Sphere American Mathematical Monthly. 122: 299-321 |
Moeckel R, Montgomery R. (2015) Realizing all reduced syzygy sequences in the planar three-body problem Nonlinearity. 28: 1919-1935 |