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Complex Functions Examples c-4

Power series

Complex Functions Examples c-4
3.2 (14 reviews)
ISBN: 978-87-7681-388-8
1 edition
Pages : 134
  • Price: 129.00 kr
  • Price: €13.99
  • Price: £13.99
  • Price: ₹250
  • Price: $13.99
  • Price: 129.00 kr
  • Price: 129.00 kr

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Users who viewed this item also viewed

  1. Complex Functions Examples c-3 Elementary Analytic Functions and Harmonic Functions

  2. Complex Functions Examples c-6 Calculus of Residues

  3. Sequences and Power Series

  4. Complex Functions Examples c-8 Some Classical Transforms

  5. Real Functions in One Variable

  6. Complex Functions Examples c-9 The Argument Principle and Many-valued Functions

  7. Complex Functions Examples c-7 Applications of the Calculus of Residues

  8. Complex Functions Examples c-5 Laurent Series

About the book

  1. Description
  2. Preface
  3. Content

Description

This is the fourth textbook you can download containing examples from the Theory of Complex Functions. In this book we shall only consider complex power series and their relationship to the general theory.

This book requires knowledge of Calculus 1 and Calculus 2.

Preface

This is the fourth book containing examples from the Theory of Complex Functions. In this volume we shall only consider complex power series and their relationship to the general theory, and finally the technique of solving linear differential equations with polynomial coefficients by means of a power series.

Even if I have tried to be careful about this text, it is impossible to avoid errors, in particular in the first edition. It is my hope that the reader will show some understanding of my situation.

Leif Mejlbro

11th June 2008

Content

  1. Some simple theoretical results concerning power series
  2. Simple Fourier series in the Theory of Complex Functions
  3. Power series
  4. Analytic functions described as power series
  5. Linear differential equations and the power series method
  6. The classical differential equations
  7. Some more difficult differential equations
  8. Zeros of analytic functions
  9. Fourier series
  10. The maximum principle
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