International Mathematics Research Notices

International Mathematics Research Notices (2008) Vol. 2008 : article ID rnn031, 52 pages, doi:10.1093/imrn/rnn031 published on May 1, 2008

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Global Action–Angle Variables for the Periodic Toda Lattice

Andreas Henrici and Thomas Kappeler

Institut für Mathematik, Universität Zürich, Winterthurerstrasse 190, CH-8057 Zürich, Switzerland

Correspondence: Correspondence to be sent to: thomas.kappeler{at}math.uzh.ch

In this paper, we construct global action–angle variables for the periodic Toda lattice.

References

1. Bättig D., Bloch A. M., Guillot J. C., Kappeler T. On the symplectic structure of the phase space for periodic KdV, Toda, and defocusing NLS. Duke Mathematical Journal (1995) 79:549–604.[CrossRef][ISI]
2. Bättig D., Grébert B., Guillot J. C., Kappeler T. Fibration of the phase space of the periodic Toda lattice. Journal de Math¥ematiques Pures et Appliqu¥ees (1993) 72:553–65.
3. Fermi E., Pasta J., Ulam S. Studies of non linear problems. Collected Papers of Enrico Fermi. vol. 2:978–88. Los Alamos Rpt, LA-1940 (1955). Chicago, IL: University of Chicago Press, 1965. Theory, Methods and Applications, 2nd ed. New York: Marcel Dekker, 2000.
4. Flaschka H. The Toda lattice. I. Existence of integrals. Physical Review, Sec. B (1974) 9:1924–5.[CrossRef]
5. Flaschka H., McLaughlin D. Canonically conjugate variables for the Korteweg-de Vries equation and the Toda lattice with periodic boundary conditions. Progress of Theoretical Physics (1976) 55:438–56.[CrossRef][ISI]
6. Garnett J. Applications of Harmonic Measure (1986) New York: Wiley. University of Arkansas Lecture Notes in Mathematics, 8.
7. Garnett J., Trubowitz E. Gaps and bands of one dimensional periodic Schrödinger operators. Commentarii Mathematici Helvetici (1984) 59:258–312.[CrossRef][ISI]
8. Grébert B., Kappeler T., Pöschel J. Normal form theory for the NLS equation: A preliminary report. (2003) preprint.
9. Henrici A., Kappeler T. Global Birkhoff coordinates for the periodic Toda lattice. (2008) preprint arXiv:0802.4252v1.
10. Henrici A., Kappeler T. Birkhoff normal form for the periodic Toda lattice. to appear in Contemporary Mathematics, and (2006): preprint arXiv:nlin/0609045v1.
11. Kappeler T., Makarov M. On Birkhoff coordinates for KdV. Annales Henri Poincaré (2001) 2:807–56.[CrossRef][ISI]
12. Kappeler T., Pöschel J. KdV & KAM (2003) 45. Berlin: Springer. Ergebnisse der Mathematik, 3. Folge.
13. Kappeler T., Topalov P. Global well-posedness of KdV in . Duke Mathematical Journal (2006) 135(2):327–60.[CrossRef][ISI]
14. Marchenko V. A., Ostrovskii I. V. A characterization of the spectrum of Hill's operator. Math. SSSR-Sbornik (1975) 97:493–554.
15. McKean H. P., Vaninsky K. L. Action-angle variables for the cubic Schroedinger equation. Communications on Pure and Applied Mathematics (1997) 50:489–562.[CrossRef][ISI]
16. van Moerbeke P. The spectrum of Jacobi matrices. Inventiones Mathematicae (1976) 37:45–81.[CrossRef][ISI]
17. Teschl G. Jacobi Operators and Completely Integrable Nonlinear Lattices (2000) Providence, RI: American Mathematical Society. Mathematical Surveys and Monographs, 72.
18. Toda M. Theory of Nonlinear Lattices (1989) 2nd enl. ed. Berlin: Springer. Springer Series in Solid-State Sciences, 20.

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This Article Abstract Full Text (PDF) Alert me when this article is cited Alert me if a correction is posted Services Email this article to a friend Similar articles in this journal Alert me to new issues of the journal Add to My Personal Archive Download to citation manager Request Permissions How to cite this article Google Scholar Articles by Henrici, A. Articles by Kappeler, T. Social Bookmarking          What's this?