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A geometric mechanism for diffusion in Hamiltonian systems overcoming the large gap problem: Announcement of results
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A geometric mechanism for diffusion in Hamiltonian systems overcoming the large gap problem: Announcement of results
Amadeu Delshams, Rafael de la Llave, and Tere M. Seara
Abstract.
We present a geometric mechanism for diffusion in Hamiltonian systems. We also present tools that allow us to verify it in a concrete model. In particular, we verify it in a system which presents the large gap problem.
Copyright 2003 American Mathematical Society
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Article Info
- ERA Amer. Math. Soc. 09 (2003), pp. 125-134
- Publisher Identifier: S 1079-6762(03)00121-5
- 2000 Mathematics Subject Classification. Primary 37J40; Secondary 70H08, 37D10, 70K70
- Key words and phrases. Nearly integrable Hamiltonian systems, normal forms, slow variables, normally hyperbolic invariant manifolds, KAM theory, Arnold diffusion
- Received by editors March 9, 2003
- Received by editors in revised form September 19, 2003
- Posted on December 4, 2003
- Communicated by Svetlana Katok
- Comments (When Available)
Amadeu Delshams
Departament de Matemŕtica Aplicada I, Universitat Politčcnica de Catalunya, Diagonal 647, 08028 Barcelona, Spain
E-mail address: Amadeu.Delshams@upc.es
Rafael de la Llave
Department of Mathematics, University of Texas, Austin, TX 78712-1802
E-mail address: llave@math.utexas.edu
Tere M. Seara
Departament de Matemŕtica Aplicada I, Universitat Politčcnica de Catalunya, Diagonal 647, 08028 Barcelona, Spain
E-mail address: tere.m-seara@upc.es
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