Hausdorff and Gromov distances in quantale-enriched categories /

Akhvlediani, Andrei.

January 2008

Thesis (M.A.)--York University, 2008. Graduate Programme in Mathematics and Statistics. / Typescript. Includes bibliographical references (leaves 166-167). Also available on the Internet. MODE OF ACCESS via web browser by entering the following URL: http://gateway.proquest.com/openurl?url_ver=Z39.88-2004&res_dat=xri:pqdiss&rft_val_fmt=info:ofi/fmt:kev:mtx:dissertation&rft_dat=xri:pqdiss:MR45921

Groups of measurable and measure preserving transformations

Eigen, Stanley J.

January 1982

In chapters I and II, we show that the group G of invertible, non-singular transformations of a Lebesgue space is perfect, simple, and has no outer automorphisms. Some related results are obtained for the subgroup of measure preserving transformations and for the full group of an ergodic transformation. Further results are given with the underlying Lebesgue space replaced by a homogeneous measure algebra. It is also shown, in chapter III, that ergodic transformations are algebraically distinguishable from non-ergodics. Chapter IV introduces the notion of a fibered ergodic transformation. A fibered analogue of Dye's theorem is proved. In chapter V the family of transformations satisfying Dye's theorem for two fixed ergodics is shown to be dense in the coarse topology. Finally, in chapter VI, the concept of a triangle set in the unit square is introduced. Using this notion, a sufficiency condition for the ergodicity of T x S is obtained.

Ergodic theory.

Transformations (Mathematics)

Measure theory.

Large deviation principles for random measures /

Hwang, Dae-sik.

January 1991

Thesis (Ph. D.)--Oregon State University, 1991. / Typescript (photocopy). Includes bibliographical references (leaves 71-73). Also available on the World Wide Web.

Mycielski-Regular Measures

Bass, Jeremiah Joseph

08 1900

Let μ be a Radon probability measure on M, the d-dimensional Real Euclidean space (where d is a positive integer), and f a measurable function. Let P be the space of sequences whose coordinates are elements in M. Then, for any point x in M, define a function ƒn on M and P that looks at the first n terms of an element of P and evaluates f at the first of those n terms that minimizes the distance to x in M. The measures for which such sequences converge in measure to f for almost every sequence are called Mycielski-regular. We show that the self-similar measure generated by a finite family of contracting similitudes and which up to a constant is the Hausdorff measure in its dimension on an invariant set C is Mycielski-regular.

Measure theory

probability

self-similar sets

Uniformly σ-Finite Disintegrations of Measures

Backs, Karl

08 1900

A disintegration of measure is a common tool used in ergodic theory, probability, and descriptive set theory. The primary interest in this paper is in disintegrating σ-finite measures on standard Borel spaces into families of σ-finite measures. In 1984, Dorothy Maharam asked whether every such disintegration is uniformly σ-finite meaning that there exists a countable collection of Borel sets which simultaneously witnesses that every measure in the disintegration is σ-finite. Assuming Gödel’s axiom of constructability I provide answer Maharam's question by constructing a specific disintegration which is not uniformly σ-finite.

Measure theory

uniformization

analysis

disintegration of measure

Groups of measurable and measure preserving transformations

Eigen, Stanley J.

January 1982

No description available.

Measure theory.

Transformations (Mathematics)

Ergodic theory.

Distance Sets and Gap Lemma

Boone, Zackary Ryan

26 May 2022

Many problems in geometric measure theory are centered around finding conditions and structures on a set to guarantee that its distance set must be large. Two notions of structure that are of importance in this work are Hausdorff dimension and thickness. Recent progress has been made on generalizing the notion of thickness so part of this work also generalizes previous results using this new upgraded version of thickness. We also show why a famous conjecture about distance sets does not hold on the real line and thus, why this conjecture needs to happen in higher dimensions. Furthermore, we give explicit distance set and thickness calculations for a special class of self-similar sets. / Master of Science / Part of the study of geometric measure theory is centered around creating interesting structures to place on a set and determining what sort of threshold on that structure allows you to guarantee that some interesting geometric property exists for that set. An example of this is determining when you can guarantee that a set contains many unique distances between elements in that set. This work presents various types of structures that help to investigate the problem of when you can guarantee that a set has the previously mentioned geometric property.

Distance Sets

Geometric Measure Theory

Newhouse Thickness

The Mattila-Sjölin Problem for Triangles

Romero Acosta, Juan Francisco

08 May 2023

This dissertation contains work from the author's papers [35] and [36] with coauthor Eyvindur Palsson. The classic Mattila-Sjolin theorem shows that if a compact subset of $mathbb{R}^d$ has Hausdorff dimension at least $frac{(d+1)}{2}$ then its set of distances has nonempty interior. In this dissertation, we present a similar result, namely that if a compact subset $E$ of $mathbb{R}^d$, with $d geq 3$, has a large enough Hausdorff dimension then the set of congruence classes of triangles formed by triples of points of $E$ has nonempty interior. These types of results on point configurations with nonempty interior can be categorized as extensions and refinements of the statement in the well known Falconer distance problem which establishes a positive Lebesgue measure for the distance set instead of it having nonempty interior / Doctor of Philosophy / By establishing lower bounds on the Hausdorff dimension of the given compact set we can guarantee the existence of lots of triangles formed by triples of points of the given set. This type of result can be categorized as an extension and refinement of the statement in the well known Falconer distance problem which establishes that if a compact set is large enough then we can guarantee the existence of a significant amount of distances formed by pairs of points of the set

harmonic analysis

geometric measure theory

Hausdorff dimension

Countable Additivity, Exhaustivity, and the Structure of Certain Banach Lattices

Huff, Cheryl Rae

08 1900

The notion of uniform countable additivity or uniform absolute continuity is present implicitly in the Lebesgue Dominated Convergence Theorem and explicitly in the Vitali-Hahn-Saks and Nikodym Theorems, respectively. V. M. Dubrovsky studied the connection between uniform countable additivity and uniform absolute continuity in a series of papers, and Bartle, Dunford, and Schwartz established a close relationship between uniform countable additivity in ca(Σ) and operator theory for the classical continuous function spaces C(K). Numerous authors have worked extensively on extending and generalizing the theorems of the preceding authors. Specifically, we mention Bilyeu and Lewis as well as Brooks and Drewnowski, whose efforts molded the direction and focus of this paper. This paper is a study of the techniques used by Bell, Bilyeu, and Lewis in their paper on uniform exhaustivity and Banach lattices to present a Banach lattice version of two important and powerful results in measure theory by Brooks and Drewnowski. In showing that the notions of exhaustivity and continuity take on familiar forms in certain Banach lattices of measures they show that these important measure theory results follow as corollaries of the generalized Banach lattice versions. This work uses their template to generalize results established by Bator, Bilyeu, and Lewis.

uniform exhaustivity

Banach lattices

mathematics

Banach lattices.

Measure theory.

Existence of laws with given marginals and specified support

Shortt, Rae Michael Andrew

January 1982

Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1982. / MICROFICHE COPY AVAILABLE IN ARCHIVES AND SCIENCE / Bibliography: leaves 106-109. / by Rae Michael Andrew Shortt. / Ph.D.

Mathematics.

Generalized spaces

Set theory

Probabilities

Measure theory

Metric spaces