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Introduction to the series | ||
Preface | ||
Introduction | 1 | |
1 | Tangent variation principle: satellite principles | 4 |
2 | Nevanlinna and Ahlfors' theories: additions | 40 |
3 | [Gamma]-lines' approach in the theory of meromorphic functions | 82 |
4 | Distribution of [Gamma]-lines for functions meromorphic in C: Applications | 102 |
5 | Some applied problems | 144 |
References | 165 | |
Index | 175 |
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Add Gamma-Lines: On the Geometry of Real and Complex Functions, The history of mathematics is, to a considerable extent, connected with the study of solutions of the equation f(x)=a=const for functions f(x) of one real or complex variable. Therefore, it is surprising that we know very little about solutions of u(x,y)=, Gamma-Lines: On the Geometry of Real and Complex Functions to the inventory that you are selling on WonderClubX
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Add Gamma-Lines: On the Geometry of Real and Complex Functions, The history of mathematics is, to a considerable extent, connected with the study of solutions of the equation f(x)=a=const for functions f(x) of one real or complex variable. Therefore, it is surprising that we know very little about solutions of u(x,y)=, Gamma-Lines: On the Geometry of Real and Complex Functions to your collection on WonderClub |