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复与p进位分析中有关值分布及微分性的一些论题
作者:(美国)A.Escassut、等
出版社:科学出版社
出版时间:2008-01-01
ISBN:9787030204066
定价:¥98.00
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内容简介
The recent advancements ,new results and applications of complex analysis and p-adic analysis are rather extensive. In this book, the focus centers on those topics which pertain to two intrinsic properties of analytic functions: value distribution and complex differentiability. Complex analysis and p-adic analysis are two closely linked, old branches of mathematics that have played a prominent role in the development of modem mathematics。
作者简介
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目录
Preface
List of Contributors
Part Ⅰ Value Distribution of Complex and P-adic Functions
Chapter 1 The Second Main Theorem on Generalized Parabolic Manifolds
1.1 Monge-Ampere equations and generalized parabolic manifolds
1.2 Projectivized bundles over Stein manifolds
1.3 Meromorphic global forms
1.4 Analytic and algebraic Pliicker Formulas: The classical case
1.5 Pluckers formulas for generalized parabolic manifolds
1.6 An analogue of the Ahlfors-Stoll estimate
1.7 The second main theorem
Chapter 2 P-adic Value Distribution
2.1 Ultrametric analytic functions
2.2 Lazards problem and p-adic Nevanlinna theory
2.3 Applications of the Nevanlinna theory
Chapter 3 Survey on Meromorphic Functions of Uniqueness
3.1 Introduction and basic results
3.2 Main results and examples
Chapter 4 A Survey on Uniqueness Polynomials and Unique Range Sets
4.1 Meromorphic functions sharing points
4.2 Unique range set for meromorphic functions
4.3 Uniqueness polynomials for meromorphic functions
Chapter 5 On Petrenkos Theory of Growth of Meromorphic Functions
5.1 The growth of functions meromorphic in the plane
5.2 The growth of functions meromorphic in the disc
5.3 Separated maximum modulus points of entire and meromorphic functions
5.4 Strong asymptotic values and strong asymptotic spots of entire and meromorphic functions
Chapter 6 Linear Operators, Fourier Transforms and the Riemann ξ-function
6.1 The Laguerre-P61ya class and the Riemann ξ-function
6.2 Complex zero decreasing sequences and λ-sequences
6.3 The distribution of zeros of Fourier transforms
6.4 Infinite order differential operators and the Riemann ξ-function
Chapter 7 Hyperbolic Hypersurfaces of Lower Degrees
7.1 Introduction and main techniques
7.2 Hyperbolic curves
7.3 Hyperbolic surfaces
7.4 Hyperbolic hypersurfaces in P4(C)
Chapter 8 Admissible Solutions of Functional Equations of Diophantine Type
8.1 Introduction
8.2 Background and results
8.3 Preliminary lemmas
8.4 Proofs of the results
Part Ⅱ New Applications of the Concept of Differentiability
Part Ⅲ Boundary Value Problems
List of Contributors
Part Ⅰ Value Distribution of Complex and P-adic Functions
Chapter 1 The Second Main Theorem on Generalized Parabolic Manifolds
1.1 Monge-Ampere equations and generalized parabolic manifolds
1.2 Projectivized bundles over Stein manifolds
1.3 Meromorphic global forms
1.4 Analytic and algebraic Pliicker Formulas: The classical case
1.5 Pluckers formulas for generalized parabolic manifolds
1.6 An analogue of the Ahlfors-Stoll estimate
1.7 The second main theorem
Chapter 2 P-adic Value Distribution
2.1 Ultrametric analytic functions
2.2 Lazards problem and p-adic Nevanlinna theory
2.3 Applications of the Nevanlinna theory
Chapter 3 Survey on Meromorphic Functions of Uniqueness
3.1 Introduction and basic results
3.2 Main results and examples
Chapter 4 A Survey on Uniqueness Polynomials and Unique Range Sets
4.1 Meromorphic functions sharing points
4.2 Unique range set for meromorphic functions
4.3 Uniqueness polynomials for meromorphic functions
Chapter 5 On Petrenkos Theory of Growth of Meromorphic Functions
5.1 The growth of functions meromorphic in the plane
5.2 The growth of functions meromorphic in the disc
5.3 Separated maximum modulus points of entire and meromorphic functions
5.4 Strong asymptotic values and strong asymptotic spots of entire and meromorphic functions
Chapter 6 Linear Operators, Fourier Transforms and the Riemann ξ-function
6.1 The Laguerre-P61ya class and the Riemann ξ-function
6.2 Complex zero decreasing sequences and λ-sequences
6.3 The distribution of zeros of Fourier transforms
6.4 Infinite order differential operators and the Riemann ξ-function
Chapter 7 Hyperbolic Hypersurfaces of Lower Degrees
7.1 Introduction and main techniques
7.2 Hyperbolic curves
7.3 Hyperbolic surfaces
7.4 Hyperbolic hypersurfaces in P4(C)
Chapter 8 Admissible Solutions of Functional Equations of Diophantine Type
8.1 Introduction
8.2 Background and results
8.3 Preliminary lemmas
8.4 Proofs of the results
Part Ⅱ New Applications of the Concept of Differentiability
Part Ⅲ Boundary Value Problems
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