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Geometry of Holomorphic Mappings de Sergey Pinchuk

Geometry of Holomorphic Mappings: Frontiers in Mathematics

Autor Sergey Pinchuk, Rasul Shafikov, Alexandre Sukhov
en Limba Engleză Paperback – 15 sep 2023
This monograph explores the problem of boundary regularity and analytic continuation of holomorphic mappings between domains in complex Euclidean spaces. Many important methods and techniques in several complex variables have been developed in connection with these questions, and the goal of this book is to introduce the reader to some of these approaches and to demonstrate how they can be used in the context of boundary properties of holomorphic maps. The authors present substantial results concerning holomorphic mappings in several complex variables with improved and often simplified proofs. Emphasis is placed on geometric methods, including the Kobayashi metric, the Scaling method, Segre varieties, and the Reflection principle. 
Geometry of Holomorphic Mappings will provide a valuable resource for PhD students in complex analysis and complex geometry; it will also be of interest to researchers in these areas as a reference.
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Specificații

ISBN-13: 9783031371486
ISBN-10: 3031371488
Pagini: 213
Ilustrații: XI, 213 p. 2 illus. in color.
Dimensiuni: 168 x 240 mm
Greutate: 0.37 kg
Ediția:1st ed. 2023
Editura: Springer Nature Switzerland
Colecția Birkhäuser
Seria Frontiers in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

Chapter. 1. Preliminaries.- Chapter. 2. Why boundary regularity?.- Chapter. 3. Continuous extension of holomorphic mappings.- Chapter. 4. Boundary smoothness of holomorphic mappings.- Chapter. 5. Proper holomorphic mappings.- Chapter. 6. Uniformization of domains with large automorphism groups.- Chapter. 7. Local equivalence of real analytic hypersurfaces.- Chapter. 8. Geometry of real hypersurfaces: analytic continuation.- Chapter. 9. Segre varieties.- Chapter. 10. Holomorphic correspondences.- Chapter. 11. Extension of proper holomorphic mappings.- Chapter. 12. Extension in C2.- Appendix.- Bibliography.- Index.

Notă biografică

Sergey Pinchuk graduated from Moscow State University in 1971. He received his PhD (Candidate in Math) in 1974 and habilitation (Doctor of Sciences) in 1980 also from Moscow State University. He is currently a professor at Indiana University. His main work is dedicated to several complex variables. Sergey Pinchuk was an invited plenary speaker at the International Congress of Mathematicians in 1983 and 1998.
Rasul Shafikov received PhD in Mathematics in 2001 at Indiana University under the supervision of Sergey Pinchuk. He was a post-doc at Stony Brook University, New York, and a visiting scholar at the Max Planck Math Institute in Bonn, Germany. Since 2004 he is a professor at the University of Western Ontario, Canada. Rasul Shafikov is the author of over 40 papers in the area of several complex variables, complex geometry and dynamical systems.
Alexandre Sukhov was born in Ufa (Russia) in 1964. He received PhD at the Institute of Mathematics of the Russian Academy of Sciences in Ufa, 1989. From 1995 to 1999 he was maitre de conferences at the University Aix-Marseille-1. He received HDR (habilitation à diriger des recherches) from this university. From 1999 Alexandre Sukhov is a professor at the University of Lille. Alexandre Sukhov is the author of over 80 papers in complex analysis and adjacent areas, such as the non-linear analysis, PDE and symplectic geometry.

Textul de pe ultima copertă

This monograph explores the problem of boundary regularity and analytic continuation of holomorphic mappings between domains in complex Euclidean spaces. Many important methods and techniques in several complex variables have been developed in connection with these questions, and the goal of this book is to introduce the reader to some of these approaches and to demonstrate how they can be used in the context of boundary properties of holomorphic maps. The authors present substantial results concerning holomorphic mappings in several complex variables with improved and often simplified proofs. Emphasis is placed on geometric methods, including the Kobayashi metric, the Scaling method, Segre varieties, and the Reflection principle. 
Geometry of Holomorphic Mappings will provide a valuable resource for PhD students in complex analysis and complex geometry; it will also be of interest to researchers in these areas as a reference.

Caracteristici

Emphasizes geometric methods, such as the Scaling method and the Reflection principle Features improved and simplified proofs of important results Offers a unified treatment theory of boundary behavior of holomorphic mappings