Book contents
- Frontmatter
- Contents
- Preface
- Preface to the 3rd Edition
- Chapter 1 Introduction
- Chapter 2 Preliminaries
- Chapter 3 Polynomials
- Chapter 4 Polynomial Splines
- Chapter 5 Computational Methods
- Chapter 6 Approximation Power of Splines
- Chapter 7 Approximation Power of Splines (Free Knots)
- Chapter 8 Other Spaces of Polynomial Splines
- Chapter 9 Tchebycheffian Splines
- Chapter 10 L-Splines
- Chapter 11 Generalized Splines
- Chapter 12 Tensor-Product Splines
- Chapter 13 Some Multidimensional Tools
- Supplement
- References
- New References
- Index
Preface to the 3rd Edition
Published online by Cambridge University Press: 06 January 2010
- Frontmatter
- Contents
- Preface
- Preface to the 3rd Edition
- Chapter 1 Introduction
- Chapter 2 Preliminaries
- Chapter 3 Polynomials
- Chapter 4 Polynomial Splines
- Chapter 5 Computational Methods
- Chapter 6 Approximation Power of Splines
- Chapter 7 Approximation Power of Splines (Free Knots)
- Chapter 8 Other Spaces of Polynomial Splines
- Chapter 9 Tchebycheffian Splines
- Chapter 10 L-Splines
- Chapter 11 Generalized Splines
- Chapter 12 Tensor-Product Splines
- Chapter 13 Some Multidimensional Tools
- Supplement
- References
- New References
- Index
Summary
This book was originally published by Wiley-Interscience in 1981. A second edition was published in 1993 by Krieger. The two differ only in that a number of misprints were corrected. Both editions are now out of print. However, spline functions remain an active research area with important applications in a wide variety of fields, including some, such as Computer-Aided Geometric Design (CAGD) and Wavelets, which did not exist in 1981. This continued interest in the basic theory of splines was the motivation for preparing this third edition of the book.
There have been many developments in the theory of splines over the past twentyfive years. While it was not my intention of rewrite this book to cover all of these developments, David Tranah of Cambridge University Press convinced me that it would be useful to prepare a supplement to the book which gives an overview of the main developments with pointers to the literature. Tracking down this literature was a major undertaking, and more than 250 new references are included here. However, this is still far from a complete list. For an extended list, see the online bibliography at www.math.vanderbilt.edu/∼schumake/splinebib.html. I include links there to a similar bibliography for splines on triangulations, and to the much larger spline bibliography in TEX form maintained by Carl de Boor and I.
Interpolation, approximation, and the numerous other applications of splines are not treated in this book due to lack of space. Consequently, I have elected not to discuss them in the supplement either, and the newlist of references does not include any applied papers or books.
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- Spline Functions: Basic Theory , pp. xv - xviPublisher: Cambridge University PressPrint publication year: 2007
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