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**Jacobi operators and completely integrable nonlinear lattices.**
*(English)*
Zbl 1056.39029

Mathematical Surveys and Monographs 72. Providence, RI: American Mathematical Society (ISBN 0-8218-1940-2/hbk). xvii, 351 p. (2000).

Summary: This volume can serve as an introduction and a reference source on spectral and inverse spectral theory of Jacobi operators (i.e., second order symmetric difference operators) and applications of those theories to the Toda and Kac-van Moerbeke hierarchy. Beginning with second order difference equations, the author develops discrete Weyl-Titchmarsh-Kodaira theory, covering all classical aspects, such as Weyl \(m\)-functions, spectral functions, the moment problem, inverse spectral theory, and uniqueness results. The author then investigates more advanced topics, such as locating the essential, absolutely continuous, and discrete spectrum, subordinacy, oscillation theory, trace formulas, random operators, almost periodic operators, (quasi-)periodic operators, scattering theory, and spectral deformations. Utilizing the Lax approach, he introduces the Toda hierarchy and its modified counterpart, the Kac-van Moerbeke hierarchy. Uniqueness and existence theorems for solutions, expressions for solutions in terms of Riemann theta functions, the inverse scattering transform, BĂ¤cklund transformations, and soliton solutions are derived.

This text covers all basic topics of Jacobi operators and includes recent advances. It is suitable for use as a text at the advanced graduate level.

This text covers all basic topics of Jacobi operators and includes recent advances. It is suitable for use as a text at the advanced graduate level.

### MSC:

39A70 | Difference operators |

39-02 | Research exposition (monographs, survey articles) pertaining to difference and functional equations |

35Q58 | Other completely integrable PDE (MSC2000) |

37K60 | Lattice dynamics; integrable lattice equations |

39A12 | Discrete version of topics in analysis |

47B36 | Jacobi (tridiagonal) operators (matrices) and generalizations |

82B23 | Exactly solvable models; Bethe ansatz |