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Klein-Dirac Quadric and Multidimensional Toda Lattice via Pseudo-positive Moment Problem

In 1974 Jürgen Moser has shown that the classical Moment Problem plays a fundamental role for the theory of completely integrable systems, by proving that the simplest case of the finite Toda lattice is described exhaustively in its terms. In particular, the Jacobi matrix defined by the Flaschka variables corresponds to the Schrödinger operator related to the Korteweg-de Vries operator. In the present paper we use a recent breakthrough in the area of the multidimensional Moment Problem in order to develop a multidimensional generalization of the finite Toda lattice. Our construction is based on the notion of pseudo-positive measure and the notion of multidimensional Markov-Stieltjes transform naturally defined on the Klein-Dirac quadric. An important consequence of the properties of the Markov-Stieltjes transform is a new method for summation of multidimensional divergent series on the Klein-Dirac quadric.

preprint2013arXivOpen access
Sergio AlbeverioOgnyan Kounchev
math.CVmath.APmath-phmath.MPmath.SPquant-ph
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Sergio AlbeverioOgnyan Kounchev

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