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Uniqueness theorems for entire functions concerning fixed points

✍ Scribed by Jilong Zhang

Publisher
Elsevier Science
Year
2008
Tongue
English
Weight
526 KB
Volume
56
Category
Article
ISSN
0898-1221

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✦ Synopsis

This paper is devoted to studying the uniqueness problem of entire functions sharing one value or fixed points. We improve some results given by Fang and extend some results given by Fang and Qiu and by Lin and Yi.

πŸ“œ SIMILAR VOLUMES

Uniqueness Theorems on Entire Functions
Uniqueness Theorems on Entire Functions and Their Derivatives
✍ Ping Li; Chung-Chun Yang πŸ“‚ Article πŸ“… 2001 πŸ› Elsevier Science 🌐 English βš– 73 KB

This paper studies uniqueness problems on entire functions that share a finite nonzero value counting multiplicities with their derivatives and gives a proper Ž answer to the problem proposed by L. Z. Yang ''Proceedings of the 6th Interna-. tional Colloquium on Complex Analysis, 1998,'' pp. 176᎐183

Fixed-points and uniqueness of meromorph
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r a c t In the paper, we study the uniqueness and the shared fixed-points of meromorphic functions and prove two main theorems which improve the results of Fang and Fang and Qiu.

Uniqueness Theorems for CR Functions
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## Abstract Let __M__ be a CR manifold embedded in β„­^__s__^ of arbitrary codimension. __M__ is called generic if the complex hull of the tangent space in all points of __M__ is the whole β„­^__s__^. __M__ is minimal (in sense of Tumanov) in __p__ Ο΅ __M__ if there does not exist any CR submanifold of