Ely Kerman: Publications and Preprints
New obstructions to symplectic embeddings, (with R. Hind)
Preprint posted: June 23, 2009.(submitted)
Homological resonances for Hamiltonian diffeomorphisms and Reeb flows,
(with V. L. Ginzburg)
To appear in International Mathematics Research Notices, (2009).
Preprint posted: January 29, 2009.
Action selectors and Maslov class rigidity,
International Mathematics Research Notices, (2009), doi:10.1093/imrn/rnp093.
Preprint posted: January 12, 2009.
Maslov class rigidity for Lagrangian submanifolds via Hofer's geometry, (with N. I. Sirikci)
To appear in Commentarii Mathematici Helvetici.
Preprint posted: August 10, 2008.
Displacement energy of coisotropic submanifolds and Hofer's geometry,
Journal of Modern Dynamics, Volume: 2, Number: 3, July 2008.
Preprint posted: May 3, 2007.
Hofer's geometry and Floer theory under the quantum limit,
International Mathematics Research Notices, (2008), doi:10.1093/imrn/rnm137.
Squeezing in Floer theory and refined Hofer-Zehnder capacities of sets near
symplectic submanifolds,
Geometry and Topology, 9 (2005), 1775--1834.
Symplectic homology and periodic orbits near symplectic submanifolds
(with K. Cieliebak and V. L. Ginzburg),
Commentarii Mathematici Helvetici, 79 (2004), 554--581.
Length minimizing Hamiltonian paths for symplectically aspherical manifolds (with F. Lalonde),
Annales de l'Institut Fourier, 53 (2003), 1503--1526.
New smooth counterexamples to the Hamiltonian Seifert conjecture,
The Journal of Symplectic Geometry, 2 (2002), 253--267.
Periodic orbits of Hamiltonian flows near symplectic extrema
(with V. L. Ginzburg),
Pacific Journal of Mathematics, 206 (2002), 69--91.
Periodic orbits of Hamiltonian flows near symplectic critical submanifolds,
International Mathematics Research Notices, 17 (1999), 953--969.
Periodic orbits in magnetic fields in dimensions greater than two (with V. L. Ginzburg),
Geometry and Topology in Dynamics, Ed.: M. Barge and K. Kuperberg: Publ. of AMS, Cont. Math. Series, 246 (1999), 113--121.
Symplectic geometry and the motion of a particle in a magnetic field ,
Ph.D. Thesis, University of California at Santa Cruz (2000).
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