Langbeschreibung
InhaltsangabeIntroduction.- Sheaf Theory.- Cohomology Theory.- Coherence Theory for Finite Holomorphic Maps.- Differential Forms and Dolbeault Theory.- Theorems A and B for Compact Blocks Cm.- Stein Spaces.- Applications of Theorems A and B.- The Finiteness Theorem.- Compact Riemann Surfaces.- Bibliography.- Subject Index.- List of Symbols.
Hauptbeschreibung
Rezension"Theory of Stein Spaces provides a rich variety of methods, results, and motivations - a book with masterful mathematical care and judgement. It is a pleasure to have this fundamental material now readily accessible to any serious mathematician." J. Eells in Bulletin of the London Mathematical Society (1980) "Written by two mathematicians who played a crucial role in the development of the modern theory of several complex variables, this is an important book." J.B. Cooper in Internationale Mathematische Nachrichten (1979)
Inhaltsverzeichnis
Introduction.- Sheaf Theory.- Cohomology Theory.- Coherence Theory for Finite Holomorphic Maps.- Differential Forms and Dolbeault Theory.- Theorems A and B for Compact Blocks Cm.- Stein Spaces.- Applications of Theorems A and B.- The Finiteness Theorem.- Compact Riemann Surfaces.- Bibliography.- Subject Index.- List of Symbols.