Geometric Function Theory In Several Complex Variables
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Geometric Function Theory in Several Complex Variables
Author: Junjirō Noguchi
language: en
Publisher: American Mathematical Soc.
Release Date: 1990
This is an expanded English-language version of a book by the same authors that originally appeared in the Japanese. The book serves two purposes. The first is to provide a self-contained and coherent account of recent developments in geometric function theory in several complex variables, aimed at those who have already mastered the basics of complex function theory and the elementary theory of differential and complex manifolds. The second goal is to present, in a self-contained way, fundamental descriptions of the theory of positive currents, plurisubharmonic functions, and meromorphic mappings, which are today indispensable in the analytic and geometric theories of complex functions of several variables. The book should prove useful for researchers and graduate students alike.
Function Theory of Several Complex Variables
Author: Steven George Krantz
language: en
Publisher: American Mathematical Soc.
Release Date: 2001
Emphasizing integral formulas, the geometric theory of pseudoconvexity, estimates, partial differential equations, approximation theory, inner functions, invariant metrics, and mapping theory, this title is intended for the student with a background in real and complex variable theory, harmonic analysis, and differential equations.
Several Complex Variables III
Author: G.M. Khenkin
language: en
Publisher: Springer Science & Business Media
Release Date: 1989-02-23
We consider the basic problems, notions and facts in the theory of entire functions of several variables, i. e. functions J(z) holomorphic in the entire n space en (i. e. JEH( 1 variables, as in the case n = 1, a central theme deals with questions of growth of functions and the distribu tion of their zeros. However, there are significant differences between the cases of one and several variables. In the first place there is the fact that for n 1 the zero set of an entire function is not discrete and therefore one has no analogue of a tool such as the canonical Weierstrass product, which is fundamental in the case n = 1. Second, for n> 1 there exist several different natural ways of exhausting the space