From Toda to KdV. We consider the large number of particles limit of a periodic Toda lattice for a family of initial data close to the equilibrium state. We show that each of the two edges of the spectra of the corresponding Jacobi matrices is up to an error, determined by the spectra of two Hill operators, associated to this family. We then show that the spectra of the Jacobi matrices remain almost constant when the matrices evolve along the two limiting KdV equations. Finally we prove that the Toda actions, when appropriately renormalized, converge to the ones of KdV. To cite this article: D. Bambusi et al., C R. Acad. Sci. Paris, Ser. I 347(2009).
De Toda à KdV / D. Bambusi, T, Kappeler, T. Paul. - In: COMPTES RENDUS MATHÉMATIQUE. - ISSN 1631-073X. - 347:17-18(2009 Sep), pp. 1025-1030.
De Toda à KdV
D. BambusiPrimo
;
2009
Abstract
From Toda to KdV. We consider the large number of particles limit of a periodic Toda lattice for a family of initial data close to the equilibrium state. We show that each of the two edges of the spectra of the corresponding Jacobi matrices is up to an error, determined by the spectra of two Hill operators, associated to this family. We then show that the spectra of the Jacobi matrices remain almost constant when the matrices evolve along the two limiting KdV equations. Finally we prove that the Toda actions, when appropriately renormalized, converge to the ones of KdV. To cite this article: D. Bambusi et al., C R. Acad. Sci. Paris, Ser. I 347(2009).
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