Uniqueness Theorems on Entire Functions and Their Derivatives

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

This paper deals with problems of the uniqueness of entire functions that share one value with their derivatives. The results in this paper generalize a result of Jank, Mues, and Volkmann and answer a question posed by H. Zhong and a question of Yi and Yang.

Let W be an algebraically closed field of characteristic zero, and let K be an algebraically closed field of characteristic zero, complete for an ultrametric absolute value. A(K) will denote the ring of entire functions in K and M(K) will denote the field of meromorphic functions in K. In this paper

In this paper we shall analyze the Taylor coefficients of entire functions integrable against dµp(z) = p 2π e -|z| p |z| p-2 dσ(z) where dσ stands for the Lebesgue measure on the plane and p ∈ IN, as well as the Taylor coefficients of entire functions in some weighted sup -norm spaces.

In this paper, we prove a result that if two entire functions share one small function CM and two other small functions IM, then f is a quasi-Möbius transformation of g, which generalizes G. G. Gundersen's 2CM + 2IM Theorem (see G. G.