Overview
- Provides comprehensive information on the spectral properties of quadratic operator pencils
- Includes a detailed discussion of applications to spectral problems from physics and engineering
- Presents a thorough investigation of the connection between the spectral properties of quadratic operator pencils and generalized Hermite-Biehler functions
- Many of the results presented have never before been published in a monograph
Part of the book series: Operator Theory: Advances and Applications (OT, volume 246)
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Table of contents(12 chapters)
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Operator Pencils
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Hermite–Biehler Functions
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Direct and Inverse Problems
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Background Material
About this book
The theoretical part of this monograph examines the distribution of the spectrum of operator polynomials, focusing on quadratic operator polynomials with discrete spectra. The second part is devoted to applications. Standard spectral problems in Hilbert spaces are of the form A-λI for an operator A, and self-adjoint operators are of particular interest and importance, both theoretically and in terms of applications. A characteristic feature of self-adjoint operators is that their spectra are real, and many spectral problems in theoretical physics and engineering can be described by using them. However, a large class of problems, in particular vibration problems with boundary conditions depending on the spectral parameter, are represented by operator polynomials that are quadratic in the eigenvalue parameter and whose coefficients are self-adjoint operators. The spectra of such operator polynomials are in general no more real, but still exhibit certain patterns. The distribution of these spectra is the main focus of the present volume. For some classes of quadratic operator polynomials, inverse problems are also considered. The connection between the spectra of such quadratic operator polynomials and generalized Hermite-Biehler functions is discussed in detail.
Many applications are thoroughly investigated, such as the Regge problem and damped vibrations of smooth strings, Stieltjes strings, beams, star graphs of strings and quantum graphs. Some chapters summarize advanced background material, which is supplemented with detailed proofs. With regard to the reader’s background knowledge, only the basic properties of operators in Hilbert spaces and well-known results from complex analysis are assumed.
Reviews
Authors and Affiliations
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John Knopfmacher Center for Applicable Analysis and Number Theory, University of the Witwatersrand, School of Mathematics, Johannesburg, South Africa
Manfred Möller
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Department of Algebra and Geometry, South Ukrainian National Pedagogical University, Odessa, Ukraine
Vyacheslav Pivovarchik
Bibliographic Information
Book Title: Spectral Theory of Operator Pencils, Hermite-Biehler Functions, and their Applications
Authors: Manfred Möller, Vyacheslav Pivovarchik
Series Title: Operator Theory: Advances and Applications
DOI: https://doi.org/10.1007/978-3-319-17070-1
Publisher: Birkhäuser Cham
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Copyright Information: Springer International Publishing Switzerland 2015
Hardcover ISBN: 978-3-319-17069-5Published: 29 June 2015
Softcover ISBN: 978-3-319-37567-0Published: 17 October 2016
eBook ISBN: 978-3-319-17070-1Published: 11 June 2015
Series ISSN: 0255-0156
Series E-ISSN: 2296-4878
Edition Number: 1
Number of Pages: XVII, 412
Number of Illustrations: 11 b/w illustrations
Topics: Operator Theory, Ordinary Differential Equations, Mathematical Physics