Add to ORKGIncludes bibliographical references (leaf 49)The problem of uniqueness for entire harmonic functions of exponential type was first studied by R. P. Boas, Jr. in 1972. Boas' result opened an important area of research in the theory of entire harmonic functions. In particular, uniqueness results in higher dimensions were studied by Rao and Zeilberger, and representation results were obtained by Anderson, Ching, and Chui. In this dissertation, we obtain uniqueness and representation results when the determination set is a one-dimensional discrete set. In particular, a fairly general method for deriving the basis functions is given
AbstractIn this paper, we obtain some uniqueness theorems for entire functions and their derivatives...
Abstract. We study the uniqueness problems on entire or meromorphic functions concerning differentia...
AbstractThis paper is devoted to studying the uniqueness problem of entire functions sharing one val...
Includes bibliographical references (leaf 49)The problem of uniqueness for entire harmonic functions...
AbstractIt is known that a real-valued entire harmonic functionuof exponential type less thanπis uni...
AbstractIf u is an entire harmonic function of exponential type less than π satisfying u(n, 0) = uy(...
AbstractThis paper deals with problems of the uniqueness of entire functions that share one value wi...
This paper studies uniqueness problems on entire functions that share a finite nonzero value countin...
AbstractThis paper studies the uniqueness problem on entire function that share a finite, nonzero va...
AbstractUsing Nevanlinna’s value distribution theory, we study the uniqueness of entire functions th...
AbstractThis paper studies the uniqueness problem on entire function that share a finite, nonzero va...
AbstractWe prove two uniqueness theorems for entire functions of finite order that share one finite ...
In this paper, we study the problem of uniqueness of an entire function sharing a small entire funct...
We study the uniqueness for entire functions that share small functions of finite order with differ...
Abstract. In this paper, we study the uniqueness of entire functions. We mainly obtain the following...
AbstractIn this paper, we obtain some uniqueness theorems for entire functions and their derivatives...
Abstract. We study the uniqueness problems on entire or meromorphic functions concerning differentia...
AbstractThis paper is devoted to studying the uniqueness problem of entire functions sharing one val...
Includes bibliographical references (leaf 49)The problem of uniqueness for entire harmonic functions...
AbstractIt is known that a real-valued entire harmonic functionuof exponential type less thanπis uni...
AbstractIf u is an entire harmonic function of exponential type less than π satisfying u(n, 0) = uy(...
AbstractThis paper deals with problems of the uniqueness of entire functions that share one value wi...
This paper studies uniqueness problems on entire functions that share a finite nonzero value countin...
AbstractThis paper studies the uniqueness problem on entire function that share a finite, nonzero va...
AbstractUsing Nevanlinna’s value distribution theory, we study the uniqueness of entire functions th...
AbstractThis paper studies the uniqueness problem on entire function that share a finite, nonzero va...
AbstractWe prove two uniqueness theorems for entire functions of finite order that share one finite ...
In this paper, we study the problem of uniqueness of an entire function sharing a small entire funct...
We study the uniqueness for entire functions that share small functions of finite order with differ...
Abstract. In this paper, we study the uniqueness of entire functions. We mainly obtain the following...
AbstractIn this paper, we obtain some uniqueness theorems for entire functions and their derivatives...
Abstract. We study the uniqueness problems on entire or meromorphic functions concerning differentia...
AbstractThis paper is devoted to studying the uniqueness problem of entire functions sharing one val...