Bull. Korean Math. Soc. 2021; 58(2): 269-275
Online first article March 4, 2021 Printed March 31, 2021
https://doi.org/10.4134/BKMS.b190017
Copyright © The Korean Mathematical Society.
Chang-Kwon Choi
Kunsan National University
Let $\mathbb R$ be the set of real numbers, $f,g:\mathbb R \to \mathbb R$ and $\epsilon \ge 0$. In this paper, we consider the stability of partially pexiderized exponential-radical functional equation \begin{equation} f\left(\sqrt[N]{x^N+y^N}\right)=f(x)g(y) \nonumber \end{equation} for all $x, y\in \mathbb R$, i.e., we investigate the functional inequality \begin{equation} \left|f\left(\sqrt[N]{x^N+y^N}\right)-f(x)g(y)\right| \leq \epsilon \nonumber \end{equation} for all $x, y\in \mathbb R$.
Keywords: Exponential functional equation, monomial functional equation, pexiderized functional equation, radical functional equation, stability
MSC numbers: 39B82
2008; 45(2): 397-403
2018; 55(2): 379-403
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