KUPIN, Stanislas; PEHERSTORFER, Franz; VOLBERG, Alexander; YUDITSKII, Peter

Métadonnées

Afficher la notice complète

Licence d’utilisation du document

KUPIN, Stanislas
Institut de Mathématiques de Bordeaux [IMB]

PEHERSTORFER, Franz
Institut für Analysis

VOLBERG, Alexander
Computer Science and Engineering Dept. [MSU CS]

Langue

Article de revue

Ce document a été publié dans

Operator Theory: Advances and Applications. 2009, vol. 186, p. 285-324

Springer

Résumé en anglais

An original approach to the inverse scattering for Jacobi matrices was recently suggested in Volberg-Yuditskii [2002]. The authors considered quite sophisticated spectral sets (including Cantor sets of positive Lebesgue measure), however they did not take into account the mass point spectrum. This paper follows similar lines for the continuous setting with an absolutely continuous spectrum on the half-axis and a pure point spectrum on the negative half-axis satisfying the Blaschke condition. This leads us to the solution of the inverse scattering problem for a class of canonical systems that generalizes the case of Sturm-Liouville (Schrodinger) operator.< Réduire

Mots clés en italien

Schrodinger operator

canonical differential system

inverse scattering

functional model

Métadonnées

Partager cette publication !

Licence d’utilisation du document

Inverse scattering problem for a special class of canonical systems and non-linear Fourier integral. Part I: asymptotics of eigenfunctions

Langue

Ce document a été publié dans

Résumé en anglais

Mots clés en italien

URI

Origine

Unités de recherche