9780486822372

Almost Periodic Functions

by ;
  • ISBN13:

    9780486822372

  • ISBN10:

    0486822370

  • Edition: Reprint
  • Format: Paperback
  • Copyright: 2018-08-15
  • Publisher: Dover Publications
  • Purchase Benefits
  • Free Shipping On Orders Over $35!
    Your order must be $35 or more to qualify for free economy shipping. Bulk sales, PO's, Marketplace items, eBooks and apparel do not qualify for this offer.
  • Get Rewarded for Ordering Your Textbooks! Enroll Now
List Price: $15.95 Save up to $2.39
  • Buy New
    $13.56

    NOT YET PRINTED. PLACE AN ORDER AND WE WILL SHIP IT AS SOON AS IT ARRIVES.

Supplemental Materials

What is included with this book?

  • The New copy of this book will include any supplemental materials advertised. Please check the title of the book to determine if it should include any access cards, study guides, lab manuals, CDs, etc.

Summary

Mathematician Harald Bohr, motivated by questions about which functions could be represented by a Dirichlet series, devised the theory of almost periodic functions during the 1920s. His groundbreaking work influenced many later mathematicians, who extended the theory in new and diverse directions. In this volume, Bohr focuses on an essential aspect of the theory — the functions of a real variable — in full detail and with complete proofs.
The treatment, which is based on Bohr's lectures, starts with an introduction that leads to discussions of purely periodic functions and their Fourier series. The heart of the book, his exploration of the theory of almost periodic functions, is supplemented by two appendixes that cover generalizations of almost periodic functions and almost periodic functions of a complete variable.

Author Biography

Harald August Bohr (1887–1951) was a Danish mathematician, and the brother of Nobel Prize-winning physicist Niels Bohr. He worked primarily in the area of mathematical analysis and was the founder of the field of almost periodic functions.

Table of Contents

Introduction
Purely Periodic Functions and Their Fourier Series
The Theory of Almost periodic Functions
Appendix I. Generalizations of Almost periodic Functions
Appendix II. Almost Periodic Functions of a Complex Variable
Bibliography

Rewards Program

Write a Review