Bounded Analytic Functions

  • John B. Garnett

Part of the Graduate Texts in Mathematics book series (GTM, volume 236)

Table of contents

  1. Front Matter
    Pages I-XIV
  2. John B. Garnett
    Pages 1-47
  3. John B. Garnett
    Pages 48-97
  4. John B. Garnett
    Pages 98-126
  5. John B. Garnett
    Pages 127-175
  6. John B. Garnett
    Pages 176-214
  7. John B. Garnett
    Pages 215-274
  8. John B. Garnett
    Pages 275-308
  9. John B. Garnett
    Pages 309-363
  10. John B. Garnett
    Pages 364-390
  11. John B. Garnett
    Pages 391-433
  12. Back Matter
    Pages 434-459

About this book


The book, which covers a wide range of beautiful topics in analysis, is extremely well organized and well written, with elegant, detailed proofs. The book has educated a whole generation of mathematicians with backgrounds in complex analysis and function algebras. It has had a great impact on the early careers of many leading analysts and has been widely adopted as a textbook for graduate courses and learning seminars in both the US and abroad.

- From the Citation for the 2003 Leroy P. Steele Prize for Exposition

The author has not attempted to produce a compendium. Rather, he has selected a range of topics in a many-faceted theory and, within that range, penetrated to considerable depth...the author has succeeded in bringing out the beauty of a theory which, despite its relatively advanced age---now approaching 80 years---continues to surprise and to delight its practitioners. The author has left his mark on the subject.

- Donald Sarason, Mathematical Reviews

Garnett's Bounded Analytic Functions is to function theory as Zygmund's Trigonometric Series is to Fourier analysis. Bounded Analytic Functions is widely regarded as a classic textbook used around the world to educate today's practioners in the field, and is the primary source for the experts. It is beautifully written, but intentionally cannot be read as a novel. Rather it gives just the right level of detail so that the motivated student develops the requisite skills of the trade in the process of discovering the beauty of the combination of real, complex and functional analysis.

- Donald E. Marshall, University of Washington


algebra analytic function function proof

Authors and affiliations

  • John B. Garnett
    • 1
  1. 1.Department of Mathematics 6363 Mathematical SciencesUniversity of California, Los AngelesLos AngelesUSA

Bibliographic information