Spectral theory of birth-and-death processes explicit methods with examples and perturbative approaches under domination of killing

Simon, Moritz

January 2008

Zugl.: München, Techn. Univ., Diss., 2008

Allgemeine mehrdimensionale Wavelet-Theorie und Spektraleigenschaften des Transferoperators

Saßmannshausen, Nils.

Unknown Date

Universiẗat, Diss., 2002--Marburg.

Measure-perturbed one-dimensional Schrödinger operators

Seifert, Christian

23 January 2013

In this Dissertation thesis the spectral theory of Schrödinger operators modeling quasicrystals in dimension one ist investigated. We allow for a large class of measures as potentials covering also point interactions. The main results can be stated as follows: If the potential can be very well approximated by periodic potentials, then the correspondig Schrödinger operator does not have any eigenvalues. If the potential is aperiodic and satisfies a certain finite local complexity condition, the absolutely continuous spectrum is absent. We also prove Cantor spectra of zero Lebesgue measure for a large class of (a randomized version of) the operator.

Schrödinger Operator

Spektraltheorie

Quasikristalle

Schrödinger operator

spectral theory

quasicrystals

ddc:515

Hamilton-Operator

Spektraltheorie

Fredholm Theory and Stable Approximation of Band Operators and Their Generalisations

Lindner, Marko

23 July 2009

This text is concerned with the Fredholm theory and stable approximation of bounded linear operators generated by a class of infinite matrices $(a_{ij})$ that are either banded or have certain decay properties as one goes away from the main diagonal. The operators are studied on $\ell^p$ spaces of functions $\Z^N\to X$, where $p\in[1,\infty]$, $N\in\N$ and $X$ is a complex Banach space. The latter means that our matrix entries $a_{ij}$ are indexed by multiindices $i,j\in\Z^N$ and that every $a_{ij}$ is itself a bounded linear operator on $X$. Our main focus lies on the case $p=\infty$, where new results are derived, and it is demonstrated in both general theory and concrete operator equations from mathematical physics how advantage can be taken of these new $p=\infty$ results in the general case $p\in[1,\infty]$.

ddc:500

Fredholm-Operator

Hamilton-Operator

Integraloperator

Spektraltheorie

Zufallsoperator

Spectral properties of a class of analytic operator functions and their linearizations

Trunk, Carsten.

Unknown Date

Techn. University, Diss., 2002--Berlin.

Eigenvibrations of a plate with elastically attached load

Solov'ëv, Sergey I.

11 April 2006

This paper is concerned with the investigation of the nonlinear eigenvalue problem describing the natural oscillations of a plate with a load that elastically attached to it. We study properties of eigenvalues and eigenfunctions of this eigenvalue problem and prove the existence theorem for eigensolutions. Theoretical results are illustrated by numerical experiments.

natural oscillations

plate

ddc:510

Eigenschwingung

Nichtlineares Eigenwertproblem

Spektraltheorie

Measure-perturbed one-dimensional Schrödinger operators: A continuum model for quasicrystals

Seifert, Christian

27 November 2012

In this Dissertation thesis the spectral theory of Schrödinger operators modeling quasicrystals in dimension one ist investigated. We allow for a large class of measures as potentials covering also point interactions. The main results can be stated as follows: If the potential can be very well approximated by periodic potentials, then the correspondig Schrödinger operator does not have any eigenvalues. If the potential is aperiodic and satisfies a certain finite local complexity condition, the absolutely continuous spectrum is absent. We also prove Cantor spectra of zero Lebesgue measure for a large class of (a randomized version of) the operator.

info:eu-repo/classification/ddc/515

ddc:515

Hamilton-Operator; Spektraltheorie

Factorization theory for Toeplitz plus Hankel operators and singular integral operators with flip

Ehrhardt, Torsten

02 September 2004

In this habilitation thesis a factorization theory for Toeplitz plus Hankel operators and singular integral operators with flip is established. These operators are considered with matrix-valued symbols and are thought of acting on the vector-valued analogues of the Hardy and Lebesgue spaces. A factorization theory for pure Toeplitz operators and singular integral operators without flip is known since decades and provides necessary and sufficient conditions for Fredholmness and formulas for the defect numbers. In particular, the invertibility of such operators is equivalent to the existence of a certain type of Wiener-Hopf factorization. In this thesis an analogous theory for the afore-mentioned more general classes of operators is developed. It turns out that a completely different kind of factorization is needed. This kind of factorization is studied extensively, and a corresponding Fredholm theory is established. A connection with the Hunt-Muckenhoupt-Wheeden condition is made, and several examples and applications are given as well. / In dieser Habilitationsschrift wird eine Faktorisierungstheorie für Toeplitz plus Hankel-Operatoren und singuläre Integraloperatoren mit Flip aufgestellt. Diese Operatoren werden mit matrixwertigem Symbol betrachtet und sind auf den vektorwertigen Analoga der Hardy- und Lebesgue-Räumen definiert. Eine Faktorisierungstheorie für reine Toeplitz bzw. singuläre Integraloperatoren ohne Flip ist seit Jahrzehnten bekannt. Sie liefert notwendige und hinreichende Bedingungen für die Fredholmeigenschaft und Formeln für die Defektzahlen. Insbesondere ist die Invertierbarkeit derartiger Operatoren äquivalent zur Existenz einer bestimmten Art der Wiener-Hopf-Faktorisierung. In dieser Habilitationsschrift wird eine entsprechende Theorie für die erwähnten, allgemeineren Klassen von Operatoren aufgestellt. Es stellt sich heraus, dass eine völlig andere Art der Faktorisierung benötigt wird. Diese Art der Faktorisierung wird eingehend studiert und eine entsprechende Fredholmtheorie wird entwickelt. Ein Zusammenhang mit der Hunt-Muckenhoupt-Wheeden Bedingung wird hergestellt. Mehrere Beispiele und Anwendungen werden ebenfalls angegeben.

ddc:510

Fredholm-Theorie

Hankel-Operator

Singulärer Integraloperator

Spektraltheorie

Toeplitz-Operator

Wiener-Hopf-Faktorisierung

Aspects of aperiodic order: Spectral theory via dynamical systems

Lenz, Daniel

01 July 2005

The first part of this work gives an introduction into aperiodic order in general and the lines of research pursued. The second part consists of eight manuscripts.

Cantorspectrum

Lyapunov exponent

integrated density of states

diffraction

ddc:510

Hamilton-Operator

Ordnung

Punktspektrum

Spektraltheorie

Unordnung

Generalized convolution operators and asymptotic spectral theory

Zabroda, Olga Nikolaievna

14 December 2006

The dissertation contributes to the further advancement of the theory of various classes of discrete and continuous (integral) convolution operators. The thesis is devoted to the study of sequences of matrices or operators which are built up in special ways from generalized discrete or continuous convolution operators. The generating functions depend on three variables and this leads to considerably more complicated approximation sequences. The aim was to obtain for each case a result analogous to the first Szegö limit theorem providing the first order asymptotic formula for the spectra of regular convolutions.

Grenzwertsatz von Szegö

Spektraltheorie

ddc:500

Banach-Algebra

Faltungsoperator

Toeplitz-Operator