This book discusses the process by which Ulam's conjecture is proved, aptly detailing how mathematical problems may be solved by systematically combining interdisciplinary theories. It presents the state-of-the-art of various research topics and methodologies in mathematics, and mathematical analysis by presenting the latest research in emerging research areas, providing motivation for further studies. The book also explores the theory of extending the domain of local isometries by introducing a generalized span.
For the reader, working knowledge of topology, linear algebra, and Hilbert space theory, is essential. The basic theories of these fields are gently and logically introduced. The content of each chapter provides the necessary building blocks to understanding the proof of Ulam’s conjecture and are summarized as follows: Chapter 1 presents the basic concepts and theorems of general topology. In Chapter 2, essential concepts and theorems in vector space, normed space, Banach space, inner product space, and Hilbert space, are introduced. Chapter 3 gives a presentation on the basics of measure theory. In Chapter 4, the properties of first- and second-order generalized spans are defined, examined, and applied to the study of the extension of isometries. Chapter 5 includes a summary of published literature on Ulam’s conjecture; the conjecture is fully proved in Chapter 6.
Author(s): Soon-Mo Jung
Series: Frontiers in Mathematics
Publisher: Birkhäuser
Year: 2023
Language: English
Pages: 195
City: Basel
Preface
Contents
1 Topology
1.1 Basic Concepts for Metric Spaces
1.2 Compactness for Metric Spaces
1.3 Compact Topological Spaces
1.4 Product of Topological Spaces
1.5 Completeness
1.6 Separation Properties
1.7 Open and Closed Subsets
2 Hilbert Spaces
2.1 Vector Spaces
2.2 Basis of Vector Space
2.3 Normed Spaces
2.4 Banach Spaces
2.5 Inner Product Spaces
2.6 Hilbert Spaces
2.7 Orthogonal Complements
2.8 Separable Hilbert Spaces
3 Measure Theory
3.1 Outer Measures
3.2 Measures in Abstract Spaces
3.3 Measures in Metric Spaces
3.4 Metric Outer Measures
3.5 Lebesgue Measures
3.6 Hausdorff Measures
4 Extension of Isometries
4.1 Basic Concepts and Remarks
4.2 First-Order Generalized Span
4.3 First-Order Extension of Isometries
4.4 Second-Order Generalized Span
4.5 Basic Cylinders and Basic Intervals
4.6 Second-Order Extension of Isometries
4.7 Extension of Isometries to the Entire Space
5 History of Ulam's Conjecture
5.1 Historical Background
5.2 Basic Definitions
5.3 Mycielski's Partial Solution
5.4 Fickett's Partial Solution
5.5 Jung and Kim's Partial Solution
6 Ulam's Conjecture
6.1 Basic Definitions
6.2 Cylinders
6.3 Elementary Volumes
6.4 Construction of Invariant Measure
6.5 Efficient Coverings
6.6 Ulam's Conjecture on Invariance of Measure
Bibliography
Index