Entire functions that share two pairs of small functions

In this paper, we study the unicity of entire functions and their derivatives and obtain the following result: let ff be a non-constant entire function, let a1{a}_{1}, a2{a}_{2}, b1{b}_{1}, and b2{b}_{2} be four small functions of ff such that a1≢b1{a}_{1}\not\equiv {b}_{1}, a2≢b2{a}_{2}\not\equiv {...

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Autores principales: Huang Xiaohuang, Deng Bingmao, Fang Mingliang
Formato: article
Lenguaje:EN
Publicado: De Gruyter 2021
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Acceso en línea:https://doaj.org/article/554f05690f544e6b8d37b1edfb93d443
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Sumario:In this paper, we study the unicity of entire functions and their derivatives and obtain the following result: let ff be a non-constant entire function, let a1{a}_{1}, a2{a}_{2}, b1{b}_{1}, and b2{b}_{2} be four small functions of ff such that a1≢b1{a}_{1}\not\equiv {b}_{1}, a2≢b2{a}_{2}\not\equiv {b}_{2}, and none of them is identically equal to ∞\infty . If ff and f(k){f}^{\left(k)} share (a1,a2)\left({a}_{1},{a}_{2}) CM and share (b1,b2)\left({b}_{1},{b}_{2}) IM, then (a2−b2)f−(a1−b1)f(k)≡a2b1−a1b2\left({a}_{2}-{b}_{2})f-\left({a}_{1}-{b}_{1}){f}^{\left(k)}\equiv {a}_{2}{b}_{1}-{a}_{1}{b}_{2}. This extends the result due to Li and Yang [Value sharing of an entire function and its derivatives, J. Math. Soc. Japan. 51 (1999), no. 7, 781–799].