WEIGHTED SHARING OF ENTIRE FUNCTIONS CONCERNING LINEAR DIFFERENCE OPERATORS

	WEIGHTED SHARING OF ENTIRE FUNCTIONS CONCERNING LINEAR DIFFERENCE OPERATORS
Electronic Journal of Mathematical Analysis and Applications
Volume 12, Issue 2, 2024, Page 1-10 PDF (220.71 K)
Document Type: Regular research papers
DOI: 10.21608/ejmaa.2024.270077.1129
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Author
Megha M Manakame
Bangalore university Bangalore
Abstract
In this research article, we investigates the value distribution of linear q-dierence operators Lk(f;q;c) and Lk(g;q;c), for a transcendental entire functions of zero order. At the same time we also investigate the uniqueness problems when two linear q- dierence operators of entire functions share one value with nite weight. Our results extends the previous theorems of existing studies [11],[5]. In this paper, we assume that the reader is familiar with the fundamental results [7],[14],[15]. We adopt the standard notations of the Nevanlinna theory of meromorphic function m(r; f), N(r; f), N(r; 0; f) and T(r; f) denote the proximity function, the counting function, the reduced counting function and the characteristic function of f(z), respectively. Let f and g be two non-constant meromorphic functions dened in the complex plane and S(r; f) denote any quantity satisfying S(r; f) = o(T(r; f)) as r ! 1 possibly exceptional set of nite linear measure. A meromorphic function (6 0;1) is called a small function with respect to f, if T(r; ) = S(r; f). If for some a 2 C [1, the zeros of f 􀀀 a and g 􀀀 a coincide in locations and multiplicity, we say that f and g share the value a CM(Counting Multiplicities). On the other hand, if the zeros of f 􀀀 a and g 􀀀 a coincide only in their locations, then we say that f and g share the value a IM(Ignoring Multiplicities).
Keywords
Entire functions; Linear Difference operator; Weighted sharing; Uniqueness


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