Dynamics, Thermodynamic formalism and Perturbations of Transcendental Entire Functions of Finite Singular Type

Coiculescu, Ion

05 1900

In this dissertation, we study the dynamics, fractal geometry and the topology of the Julia set of functions in the family H which is a set in the class S, the Speiser class of entire transcendental functions which have only finitely many singular values. One can think of a function from H as a generalized expanding function from the cosh family. We shall build a version of thermodynamic formalism for functions in H and we shall show among others, the existence and uniqueness of a conformal measure. Then we prove a Bowen's type formula, i.e. we show that the Hausdorff dimension of the set of returning points, is the unique zero of the pressure function. We shall also study conjugacies in the family H, perturbation of functions in the family and related dynamical properties. We define Perron-Frobenius operators for some functions naturally associated with functions in the family H and then, using fundamental properties of these operators, we shall prove the important result that the Hausdorff dimension of the subset of returning points depends analytically on the parameter taken from a small open subset of the n-dimensional parameter space.

Dynamics.

Thermodynamics.

Perturbation (Mathematics)

Fractals.

Geometric function theory.

Analytic functions.

math

dynamics

Speiser

dimension

A New Approach to Lie Symmetry Groups of Minimal Surfaces

Berry, Robert D.

18 June 2004

The Lie symmetry groups of minimal surfaces by way of planar harmonic functions are determined. It is shown that a symmetry group acting on the minimal surfaces is isomorphic with H × H^2 — the analytic functions and the harmonic functions. A subgroup of this gives a generalization of the associated family which is examined.

minimal surfaces

Lie groups

harmonic

associated family

symmetry

geometric function theory

Mathematics

Module structure of a Hilbert space

Leon, Ralph Daniel

01 January 2003

This paper demonstrates the properties of a Hilbert structure. In order to have a Hilbert structure it is necessary to satisfy certain properties or axioms. The main body of the paper is centered on six questions that develop these ideas.

Hilbert space

Invariant subspaces

Kernel functions

Functions of complex variables

Geometric function theory

The Lie Symmetries of a Few Classes of Harmonic Functions

Petersen, Willis L.

23 May 2005

In a differential geometry setting, we can analyze the solutions to systems of differential equations in such a way as to allow us to derive entire classes of solutions from any given solution. This process involves calculating the Lie symmetries of a system of equations and looking at the resulting transformations. In this paper we will give a general background of the theory necessary to develop the ideas of working in the jet space of a given system of equations, applying this theory to harmonic functions in the complex plane. We will consider harmonic functions in general, harmonic functions with constant Jacobian, harmonic functions with fixed convexity and a few other subclasses of harmonic functions.

Lie symmetries

harmonic functions

area preserving

Lie group

geometric function theory

schlicht functions

differential geometry

manifolds

Lie algebra

Mathematics