Approximation of Analytic Functions by Faber Polynomials, the Grunsky Matrix, and a Univalence Criterion

Farag, Mina

January 2022

The aim of this thesis is derive a set of polynomials defined on simply connected domains, the Faberpolynomials, in which all analytic function on the domain can be uniformly approximated. Importantconcepts and theorems such as isomorphisms, automorphisms and the Riemann mapping theorem areintroduced. Examples and applications are also included. Furthermore, the thesis will aim to introducean important consequence of the Faber polynomials, the method of the Grunsky inequalities. The first section introduces important properties of analytic functions and the concept of isomor-phisms, in particular the form of all automorphisms of the unit disc will be derived. The second sectionconsiders the Riemann mapping theorem, a theorem that relates any simply connected region that is notall of ℂ to the unit disc. A proof of the theorem beginning with the Arzelá-Ascoli theorem is provided.An application in constructing harmonic functions on arbitrary simply connected regions will be pre-sented. In the third section, definitions and properties of the Faber polynomials are developed; followedby simple examples. The section concludes with a proof and example of the statement that analyticfunctions can be approximated by Faber polynomials. In the fourth and last section of the thesis, themethod of Grunsky inequalities is presented. Starting off, the Grunsky coefficients are defined using theFaber polynomials. Properties of Grunsky coefficients such as the symmetry property and the Grunskyinequalities are then derived. To conclude it will be shown that the Grunsky inequalities provide aunivalence criterion for analytic functions defined on the unit disc.

Faber polynomials

Approximation of functions

Grunsky matrix

univalence criterion

Mathematics

Matematik

Crouzeix's Conjecture and the GMRES Algorithm

Luo, Sarah McBride

13 July 2011

This thesis explores the connection between Crouzeix's conjecture and the convergence of the GMRES algorithm. GMRES is a popular iterative method for solving linear systems and is one of the many Krylov methods. Despite its popularity, the convergence of GMRES is not completely understood. While the spectrum can in some cases be a good indicator of convergence, it has been shown that in general, the spectrum does not provide sufficient information to fully explain the behavior of GMRES iterations. Other sets associated with a matrix that can also help predict convergence are the pseudospectrum and the numerical range. This work focuses on convergence bounds obtained by considering the latter. In particular, it focuses on the application of Crouzeix's conjecture, which relates the norm of a matrix polynomial to the size of that polynomial over the numerical range, to describing GMRES convergence.

GMRES

Michel Crouzeix

Faber Polynomials

Complex Approximation

Krylov Subspace

Convergence

Iterative Methods

Linear Systems

Mathematics

CUDA-based Scientific Computing / Tools and Selected Applications

Kramer, Stephan Christoph

22 November 2012

No description available.

510

CUDA

C++

Expression Templates

Preconditioning

Sparse Matrix

Indoor Airflow

Quantum Hall Effect

Magnetic Focussing

Hardy Space Infinite Elements

Phase Retrieval

Optogenetics

Object-oriented Design

FFT

Dielectric Relaxation Spectroscopy

Poisson-Nernst-Planck Equations

BEM

FEM-BEM Coupling

Curvilinear Boundaries

Boundary Integral Equation

Transparent Boundary Conditions

Schrödinger Equation

Krylov Methods

Parallel Computing

GPU Computing

Sparse Approximate Inverse

Faber Polynomials

Polynomial Preconditioner

Conformational Sampling of Proteins

Protein Folding

Higher Order Finite Elements

Mathematics (PPN61756535X)