Function Theory: Interpolation and Corona Problems (Fields Institute Monographs) by Eric T. Sawyer (PDF)

21

 

Ebook Info

  • Published: 2009
  • Number of pages: 203 pages
  • Format: PDF
  • File Size: 13.45 MB
  • Authors: Eric T. Sawyer

Description

These lecture notes take the reader from Lennart Carleson’s first deep results on interpolation and corona problems in the unit disk to modern analogues in the disk and ball. The emphasis is on introducing the diverse array of techniques needed to attack these problems rather than producing an encyclopedic summary of achievements. Techniques from classical analysis and operator theory include duality, Blaschke product constructions, purely Hilbert space arguments, bounded mean oscillation, best approximation, boundedness of the Beurling transform, estimates on solutions to the $barpartial$ equation, the Koszul complex, use of trees, the complete Pick property, and the Toeplitz corona theorem. An extensive appendix on background material in functional analysis and function theory on the disk is included for the reader’s convenience.

User’s Reviews

Reviews from Amazon users which were colected at the time this book was published on the website:

Keywords

Free Download Function Theory: Interpolation and Corona Problems (Fields Institute Monographs) in PDF format
Function Theory: Interpolation and Corona Problems (Fields Institute Monographs) PDF Free Download
Download Function Theory: Interpolation and Corona Problems (Fields Institute Monographs) 2009 PDF Free
Function Theory: Interpolation and Corona Problems (Fields Institute Monographs) 2009 PDF Free Download
Download Function Theory: Interpolation and Corona Problems (Fields Institute Monographs) PDF
Free Download Ebook Function Theory: Interpolation and Corona Problems (Fields Institute Monographs)

Previous articleThe Corona Problem: Connections Between Operator Theory, Function Theory, and Geometry (Fields Institute Communications Book 72) 2014th Edition by Ronald G. Douglas (PDF)
Next articleSolitons by Boling Guo (PDF)