A set is called a unique range set for a certain class of functions if each inverse image of that set uniquely determines a function from the given class. We show that a finite set is a unique range set, counting multiplicity, for non-Archimedean entire functions if and only if there is no non-trivial affine transformation preserving the set. Our proof uses a theorem of Berkovich to extend, to non-Archimedean entire functions, an argument used by Boutabaa, Escassut, and Haddad to prove this result for polynomials
In this paper, we study the uniqueness problem on entire functions sharing xed points with the same ...
Abstract. By considering a question proposed by F. Gross concerning unique range sets of entire func...
AbstractUsing Nevanlinna’s value distribution theory, we study the uniqueness of entire functions th...
AbstractLet K be a complete ultrametric algebraically closed field, let A(K) be the ring of entire f...
Let S denote a finite set in extended complex plane C, f a non-constant meromorphic function in the ...
Diamond, Pomerance and Rubel (1981) proved that there are subsets M of the complex plane such that f...
By improving a generalization of Borel's theorem, the authors have been able to show that there exis...
Abstract. We first study conditions for a polynomial P(w) to satisfy the condition that P ( f) = cP...
This paper studies the unique range set of meromorphic functions and shows that there exists a finit...
The uniqueness theory of meromorphic functions studies the uniqueness conditions which can, to some ...
[[sponsorship]]數學研究所[[note]]已出版;具代表性[[note]]http://gateway.isiknowledge.com/gateway/Gateway.cgi?GWVe...
Abstract. H. X. Yi’s construction of unique range sets for entire functions is translated to the num...
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...
AbstractWe prove two uniqueness theorems for entire functions of finite order that share one finite ...
In this paper, we study the uniqueness problem on entire functions sharing xed points with the same ...
Abstract. By considering a question proposed by F. Gross concerning unique range sets of entire func...
AbstractUsing Nevanlinna’s value distribution theory, we study the uniqueness of entire functions th...
AbstractLet K be a complete ultrametric algebraically closed field, let A(K) be the ring of entire f...
Let S denote a finite set in extended complex plane C, f a non-constant meromorphic function in the ...
Diamond, Pomerance and Rubel (1981) proved that there are subsets M of the complex plane such that f...
By improving a generalization of Borel's theorem, the authors have been able to show that there exis...
Abstract. We first study conditions for a polynomial P(w) to satisfy the condition that P ( f) = cP...
This paper studies the unique range set of meromorphic functions and shows that there exists a finit...
The uniqueness theory of meromorphic functions studies the uniqueness conditions which can, to some ...
[[sponsorship]]數學研究所[[note]]已出版;具代表性[[note]]http://gateway.isiknowledge.com/gateway/Gateway.cgi?GWVe...
Abstract. H. X. Yi’s construction of unique range sets for entire functions is translated to the num...
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...
AbstractWe prove two uniqueness theorems for entire functions of finite order that share one finite ...
In this paper, we study the uniqueness problem on entire functions sharing xed points with the same ...
Abstract. By considering a question proposed by F. Gross concerning unique range sets of entire func...
AbstractUsing Nevanlinna’s value distribution theory, we study the uniqueness of entire functions th...