Numerical Computation of Electric and Magnetic Fields

  • Authors
  • Charles W. Steele

Table of contents

  1. Front Matter
    Pages i-xiv
  2. Charles W. Steele
    Pages 1-2
  3. Charles W. Steele
    Pages 3-27
  4. Charles W. Steele
    Pages 28-34
  5. Charles W. Steele
    Pages 35-58
  6. Charles W. Steele
    Pages 59-90
  7. Charles W. Steele
    Pages 91-110
  8. Charles W. Steele
    Pages 111-133
  9. Charles W. Steele
    Pages 134-165
  10. Charles W. Steele
    Pages 166-174
  11. Charles W. Steele
    Pages 175-196
  12. Back Matter
    Pages 197-223

About this book


For well over a decade, the numerical approach to field computation has been gaining progressively greater importance. Analytical methods of field compu­ tation are, at best, unable to accommodate the very wide variety of configura­ tions in which fields must be computed. On the other hand, numerical methods can accommodate many practical configurations that analytical methods cannot. With the advent of high-speed digital computers, numerical field computations have finally become practical. However, in order to implement numerical methods of field computation, we need algorithms, numerical methods, and mathematical tools that are largely quite different from those that have been traditionally used with analytical methods. Many of these algorithms have, in fact, been presented in the large number of papers that have been published on this subject in the last two decades. And to some of those who are already experienced in the art of numerical field computations, these papers, in addition to their own original work, are enough to give them the knowledge that they need to perform practical numerical field computations.


Maxwell Potential algorithms computer finite element method

Bibliographic information