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Handbook of Splines

  • Gheorghe Micula
  • Sanda Micula

Part of the Mathematics and Its Applications book series (MAIA, volume 462)

Table of contents

  1. Front Matter
    Pages i-xvi
  2. Gheorghe Micula, Sanda Micula
    Pages 1-78
  3. Gheorghe Micula, Sanda Micula
    Pages 79-102
  4. Gheorghe Micula, Sanda Micula
    Pages 103-128
  5. Gheorghe Micula, Sanda Micula
    Pages 129-178
  6. Gheorghe Micula, Sanda Micula
    Pages 179-234
  7. Gheorghe Micula, Sanda Micula
    Pages 235-256
  8. Gheorghe Micula, Sanda Micula
    Pages 295-324
  9. Gheorghe Micula, Sanda Micula
    Pages 325-336
  10. Gheorghe Micula, Sanda Micula
    Pages 337-356
  11. Gheorghe Micula, Sanda Micula
    Pages 357-382
  12. Gheorghe Micula, Sanda Micula
    Pages 383-600
  13. Back Matter
    Pages 601-606

About this book

Introduction

The purpose of this book is to give a comprehensive introduction to the theory of spline functions, together with some applications to various fields, emphasizing the significance of the relationship between the general theory and its applications. At the same time, the goal of the book is also to provide new ma­ terial on spline function theory, as well as a fresh look at old results, being written for people interested in research, as well as for those who are interested in applications. The theory of spline functions and their applications is a relatively recent field of applied mathematics. In the last 50 years, spline function theory has undergone a won­ derful development with many new directions appearing during this time. This book has its origins in the wish to adequately describe this development from the notion of 'spline' introduced by 1. J. Schoenberg (1901-1990) in 1946, to the newest recent theories of 'spline wavelets' or 'spline fractals'. Isolated facts about the functions now called 'splines' can be found in the papers of L. Euler, A. Lebesgue, G. Birkhoff, J.

Keywords

Finite applied mathematics differential equation equation finite element method function mathematics partial differential equation

Authors and affiliations

  • Gheorghe Micula
    • 1
  • Sanda Micula
    • 2
  1. 1.University of Cluj-NapocaCluj-NapocaRomania
  2. 2.Western Oregon UniversityMonmouthUSA

Bibliographic information

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