Functions of One Complex Variable I / by John B. Conway.

Format:

Book

Author/Creator:

Conway, John B., author.

Contributor:

SpringerLink (Online service)

Series:

Graduate texts in mathematics 0072-5285 ; 11.

Graduate Texts in Mathematics, 0072-5285 ; 11

Language:

English

Subjects (All):

Calculus of variations.

Mathematical analysis.

Analysis (Mathematics).

Calculus of Variations and Optimal Control; Optimization.

Analysis.

Local Subjects:

Calculus of Variations and Optimal Control; Optimization.

Analysis.

Physical Description:

1 online resource.

Edition:

Second edition 1978.

Contained In:

Springer Nature eBook

Place of Publication:

New York, NY : Springer New York : Imprint: Springer, 1978.

System Details:

text file PDF

Summary:

This book is intended as a textbook for a first course in the theory of functions of one complex variable for students who are mathematically mature enough to understand and execute E - 8 arguments. The actual pre- requisites for reading this book are quite minimal; not much more than a stiff course in basic calculus and a few facts about partial derivatives. The topics from advanced calculus that are used (e.g., Leibniz's rule for differ- entiating under the integral sign) are proved in detail. Complex Variables is a subject which has something for all mathematicians. In addition to having applications to other parts of analysis, it can rightly claim to be an ancestor of many areas of mathematics (e.g., homotopy theory, manifolds). This view of Complex Analysis as "An Introduction to Mathe- matics" has influenced the writing and selection of subject matter for this book. The other guiding principle followed is that all definitions, theorems, etc.

Contents:

I. The Complex Number System

§1. The real numbers

§2. The field of complex numbers

§3. The complex plane

§4. Polar representation and roots of complex numbers

§5. Lines and half planes in the complex plane

§6. The extended plane and its spherical representation

II. Metric Spaces and the Topology of ?

§1. Definition and examples of metric spaces

§2. Connectedness

§3. Sequences and completeness

§4. Compactness

§5. Continuity

§6. Uniform convergence

III. Elementary Properties and Examples of Analytic Functions

§1. Power series

§2. Analytic functions

§3. Analytic functions as mapping, Möbius transformations

IV. Complex Integration

§1. Riemann-Stieltjes integrals

§2. Power series representation of analytic functions

§3. Zeros of an analytic function

§4. The index of a closed curve

§5. Cauchy's Theorem and Integral Formula

§6. The homotopic version of Cauchy's Theorem and simple connectivity

§7. Counting zeros; the Open Mapping Theorem

§8. Goursat's Theorem

V. Singularities

§1. Classification of singularities

§2. Residues

§3. The Argument Principle

VI. The Maximum Modulus Theorem

§1. The Maximum Principle

§2. Schwarz's Lemma

§3. Convex functions and Hadamard's Three Circles Theorem

§4. Phragm>én-Lindel>üf Theorem

VII. Compactness and Convergence in ihe Space of Analytic Functions

§1. The space of continuous functions C(G, ?)

§2. Spaccs of analytic functions

§3. Spaccs of meromorphic functions

§4. The Riemann Mapping Theorem

§5. Weierstrass Factorization Theorem

§6. Factorization of the sine function

$7. The gamma function

§8. The Riemann zeta function

VIII. Runge's Theorem

§1. Runge's Theorem

§2. Simple connectedness

§3. Mittag-Leffler's Theorem

IX. Analytic Continuation and Riemann Surfaces

§1. Schwarz Reflection Principle

$2. Analytic Continuation Along A Path

§3. Monodromy Theorem

§4. Topological Spaces and Neighborhood Systems

$5. The Sheaf of Germs of Analytic Functions on an Open Set

$6. Analytic Manifolds

§7. Covering spaccs

X. Harmonic Functions

§1. Basic Properties of harmonic functions

§2. Harmonic functions on a disk

§3. Subharmonic and superharmonic functions

§4. The Dirichlet Problem

§5. Green's Functions

XI. Entire Functions

§1. Jensen's Formula

§2. The genus and order of an entire function

§3. Hadamard Factorization Theorem

XII. The Range of an Analytic Function

§1. Bloch's Theorem

§2. The Little Picard Theorem

§3. Schottky's Theorem

§4. The Great Picard Theorem

Appendix A: Calculus for Complex Valued Functions on an Interval

Appendix B: Suggestions for Further Study and Bibliographical Notes

References

List of Symbols.

Other Format:

Printed edition:

ISBN:

9781461263135

Access Restriction:

Restricted for use by site license.