关于移位多项式的Bruck猜想的一个结果

IF 0.5 Q3 MATHEMATICS Advances in Pure and Applied Mathematics Pub Date : 2022-06-01 DOI:10.21494/iste.op.2022.0839

B. Rao, Shilpa N.

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摘要

本文主要讨论由一个整体函数生成的微分差分多项式的Bruck猜想的建立。所考虑的多项式是有限阶的，涉及整个函数f（z）及其移位f（z+c），其中c∈c。给出了合适的例子来证明共享Borel和Nevanlinna的异常值的尖锐性。2020数学学科分类。30D35

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A result on Bruck Conjecture related to Shift Polynomials

This paper mainly concerns about establishing the Bruck conjecture for differential-difference polynomial generated by an entire function. The polynomial considered is of finite order and involves the entire function f(z) and its shift f(z + c) where c ∈ C. Suitable examples are given to prove the sharpness of sharing exceptional values of Borel and Nevanlinna. 2020 Mathematics Subject Classification. 30D35

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