Oktay Veliev Veliev Multidimensional Periodic Schrödinger Operator

Multidimensional Periodic Schrödinger Operator

von Oktay Veliev

Perturbation Theory and Applications

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Beschreibung

This book describes the direct and inverse problems of the multidimensional Schrödinger operator with a periodic potential, a topic that is especially important in perturbation theory, constructive determination of spectral invariants and finding the periodic potential from the given Bloch eigenvalues. It provides a detailed derivation of the asymptotic formulas for Bloch eigenvalues and Bloch functions in arbitrary dimensions while constructing and estimating the measure of the iso-energetic surfaces in the high-energy regime. Moreover, it presents a unique method proving the validity of the Bethe–Sommerfeld conjecture for arbitrary dimensions and arbitrary lattices. Using the perturbation theory constructed, it determines the spectral invariants of the multidimensional operator from the given Bloch eigenvalues. Some of these invariants are explicitly expressed by the Fourier coefficients of the potential, making it possible to determine the potential constructively using Bloch eigenvalues as input data. Lastly, the book presents an algorithm for the unique determination of the potential. This updated second edition includes an additional chapter that specifically focuses on lower-dimensional cases, providing the basis for the higher-dimensional considerations of the chapters that follow.


This book describes the direct and inverse problems of the multidimensional Schrödinger operator with a periodic potential, a topic that is especially important in perturbation theory, constructive determination of spectral invariants and finding the periodic potential from the given Bloch eigenvalues. It provides a detailed derivation of the asymptotic formulas for Bloch eigenvalues and Bloch functions in arbitrary dimensions while constructing and estimating the measure of the iso-energetic surfaces in the high-energy regime. Moreover, it presents a unique method proving the validity of the Bethe–Sommerfeld conjecture for arbitrary dimensions and arbitrary lattices. Using the perturbation theory constructed, it determines the spectral invariants of the multidimensional operator from the given Bloch eigenvalues. Some of these invariants are explicitly expressed by the Fourier coefficients of the potential, making it possible to determine the potential constructively using Bloch eigenvalues as input data. Lastly, the book presents an algorithm for the unique determination of the potential. This updated second edition includes an additional chapter that specifically focuses on lower-dimensional cases, providing the basis for the higher-dimensional considerations of the chapters that follow.



Details a unique method for deriving the asymptotic formulas for Bloch eigenvalues and Bloch functions in arbitrary dimensions Provides an introduction to the theoretical base for solving the inverse problems of the multidimensional Schrödinger operator Opens up new horizons for spectral analysis of quantum mechanical operators Represents a useful resource on mathematical problems in solid state quantum physics

Autor*in

Oktay Veliev

Themen in »Multidimensional Periodic Schrödinger Operator«

Bloch Eigenvalues Derivatives of Band Functions Derivatives of Band Functions Inverse Problem of Multidimensional Isoenergetic Surfaces Periodic Bloch Functions Schrödinger Operator Spectral Invariants

Stimmen zu »Multidimensional Periodic Schrödinger Operator«

Details

ISBN: 9783030245771
Verlag: Springer International Publishing
Erscheinung: 16.08.2019

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