Book contents
- Frontmatter
- Contents
- Preface
- Introduction
- Notation
- 1 Measure and dimension
- 2 Basic density properties
- 3 Structure of sets of integral dimension
- 4 Structure of sets of non-integral dimension
- 5 Comparable net measures
- 6 Projection properties
- 7 Besicovitch and Kakeya sets
- 8 Miscellaneous examples of fractal sets
- References
- Index
Preface
Published online by Cambridge University Press: 25 January 2010
- Frontmatter
- Contents
- Preface
- Introduction
- Notation
- 1 Measure and dimension
- 2 Basic density properties
- 3 Structure of sets of integral dimension
- 4 Structure of sets of non-integral dimension
- 5 Comparable net measures
- 6 Projection properties
- 7 Besicovitch and Kakeya sets
- 8 Miscellaneous examples of fractal sets
- References
- Index
Summary
This tract provides a rigorous self-contained account of the mathematics of sets of fractional and integral Hausdorff dimension. It is primarily concerned with geometric theory rather than with applications. Much of the contents could hitherto be found only in original mathematical papers, many of which are highly technical and confusing and use archaic notation. In writing this book I hope to make this material more readily accessible and also to provide a useful and precise account for those using fractal sets.
Whilst the book is written primarily for the pure mathematician, I hope that it will be of use to several kinds of more or less sophisticated and demanding reader. At the most basic level, the book may be used as a reference by those meeting fractals in other mathematical or scientific disciplines. The main theorems and corollaries, read in conjunction with the basic definitions, give precise statements of properties that have been rigorously established.
To get a broad overview of the subject, or perhaps for a first reading, it would be possible to follow the basic commentary together with the statements of the results but to omit the detailed proofs. The non-specialist mathematician might also omit the details of Section 1.1 which establishes the properties of general measures from a technical viewpoint.
A full appreciation of the details requires a working knowledge of elementary mathematical analysis and general topology. There is no doubt that some of the proofs central to the development are hard and quite lengthy, but it is well worth mastering them in order to obtain a full insight into the beauty and ingenuity of the mathematics involved.
- Type
- Chapter
- Information
- The Geometry of Fractal Sets , pp. vii - viiiPublisher: Cambridge University PressPrint publication year: 1985