Inverse Spectral Problems for Linear Differential Operators and Their Applications

✍ Scribed by V A Yurko (Author)

Publisher: CRC Press
Year: 2000
Leaves: 268
Edition: 1
Category: Library

No coin nor oath required. For personal study only.

✦ Synopsis

Aims to construct the inverse problem theory for ordinary non-self-adjoint differential operators of arbitary order on the half-line and on a finite interval. The book consists of two parts: in the first part the author presents a general inverse problem of recovering differential equations with integrable coefficients when the behaviour of the spe

✦ Table of Contents

Part One: Recovery of Differential Operators from the Weyl Matrix; 1. Formulation of the Inverse Problem: A Uniqueness Theorem 2. Solution of the Inverse Problem on the Half-line 3. Differential Operators with a Simple Spectrum 4. Solution of the Inverse Problem on a Finite Interval 5. Inverse Problems for the Self-Adjoint Case 6. Differential Operators with Singularities; Part Two: Recovery of Differential Operators from the Weyl Functions: Differential Operators with a "Separate Spectrum"; 7. Stability of the Solution of the Inverse Problem 8.Method of Standard Models: Information Conditions 9. An Inverse Problem of Elasticity Theory 10. Differential Operator with Locally Integrable Coefficients 11. Discrete Inverse Problems: Applications to Differential Operators 12. Inverse Problems for Integro-differential Operators

✦ Subjects

Mathematics & Statistics;Advanced Mathematics;Analysis - Mathematics;Differential Equations

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