Analytic Capacity, the Cauchy Transform, and Non-homogeneous Calderón–Zygmund Theory

Xavier Tolsa is Research Professor of Mathematics from ICREA - Universitat Autònoma de Barcelona. He is the author of many research papers in connection with the topics discussed in this book. The present monograph was awarded the 2013 Ferran Sunyer i Balaguer Prize.

Introduction.- Basic notation.- Chapter 1. Analytic capacity.- Chapter 2. Basic Calderón-Zygmund theory with non doubling measures.- Chapter 3. The Cauchy transform and Menger curvature.- Chapter 4. The capacity Gamma+.- Chapter 5. A Tb theorem of Nazarov, Treil and Volberg.- Chapter 6. The comparability between Gamma and Gamma +, and the semiadditivity of analytic capacity.- Chapter 7. Curvature and rectifiability.- Chapter 8. Principal values for the Cauchy transform and rectifiability.- Chapter 9. RBMO(mi) and H1 atb(mi).- Bibliography.- Index.

"This is a great book, I studied large portions of it with great benefit and pleasure. It covers a lot of material in this field ... with illuminating views from different perspectives. ... Most chapters could be read by students with a solid background in analysis, and certain parts of the book could serve as the basis for an advanced student seminar on, say, graduate level. ... this outstanding book belongs in every mathematical library." (Heiko von der Mosel, Jahresbericht der Deutschen Mathematiker-Vereinigung, Vol. 117, 2015)

"This book consists of nine chapters. Each chapter contains a very readable exposition of key results on a given area, and is followed by historical notes with references, including a discussion of further results. ... It covers a large amount of mathematics and is certainly both a valuable literature for further research and an excellent textbook for graduate students who want to study in directions of geometric measure theory and harmonic analysis." (Dachun Yang, zbMATH, Vol. 1290, 2014)