Michael Hutchings
Affiliations: | Mathematics | University of California, Berkeley, Berkeley, CA, United States |
Area:
Low Dimensional and Symplectic Topology and GeometryWebsite:
https://math.berkeley.edu/people/faculty/michael-hutchingsGoogle:
"Michael Hutchings"Bio:
http://math.berkeley.edu/~hutching/
http://www.genealogy.math.ndsu.nodak.edu/id.php?id=43253
Parents
Sign in to add mentor| Cliff Henry Taubes | grad student | 1998 | Harvard | |
| (Reidemeister Torsion in Generalized Morse Theory) | ||||
Children
Sign in to add trainee| Eli B. Lebow | grad student | 2007 | UC Berkeley |
| Andrew W. Cotton-Clay | grad student | 2009 | UC Berkeley |
| David M. Farris | grad student | 2011 | UC Berkeley |
| Keon Choi | grad student | 2013 | UC Berkeley |
| Daniel A. Cristofaro-gardiner | grad student | 2013 | UC Berkeley |
| Vinicius Gripp Barros Ramos | grad student | 2013 | UC Berkeley |
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Publications
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| Hutchings M. (2022) An elementary alternative to ECH capacities. Proceedings of the National Academy of Sciences of the United States of America. 119: e2203090119 |
| Hutchings M, Nelson J. (2020) Axiomatic S1 Morse–Bott theory Algebraic & Geometric Topology. 20: 1641-1690 |
| Cristofaro-Gardiner D, Hutchings M, Pomerleano D. (2019) Torsion contact forms in three dimensions have two or infinitely many Reeb orbits Geometry & Topology. 23: 3601-3645 |
| Hutchings M, Nelson J. (2016) Cylindrical contact homology for dynamically convex contact forms in three dimensions Journal of Symplectic Geometry. 14: 983-1012 |
| Cristofaro-Gardiner D, Hutchings M. (2016) From one reeb orbit to two Journal of Differential Geometry. 102: 25-36 |
| Hutchings M. (2016) Mean action and the Calabi invariant Journal of Modern Dynamics. 10: 511-539 |
| Hutchings M. (2016) Beyond ECH capacities Geometry and Topology. 20: 1085-1126 |
| Cristofaro-Gardiner D, Hutchings M, Ramos VGB. (2014) The asymptotics of ECH capacities Inventiones Mathematicae. 1-28 |
| Hutchings M, Taubes CH. (2013) Proof of the Arnold chord conjecture in three dimensions, II Geometry and Topology. 17: 2601-2688 |
| Choi K, Cristofaro-Gardiner D, Frenkel D, et al. (2013) Symplectic embeddings into four-dimensional concave toric domains Journal of Topology. 7: 1054-1076 |