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 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
CONTENT
I. Entire Functions -- II. Multidimensional Value Distribution Theory -- III. Invariant Metrics -- IV. Finiteness Theorems for Holomorphic Maps -- V. Holomorphic Maps in ? and the Problem of Holomorphic Equivalence -- VI. The Geometry of CR-Manifolds -- VII. Supersymmetry and Complex Geometry -- Author Index
Mathematics
Algebraic geometry
Mathematical analysis
Analysis (Mathematics)
Physics
Mathematics
Analysis
Algebraic Geometry
Theoretical Mathematical and Computational Physics
