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AbstractIn this paper, using Brzdȩk and Ciepliński’s fixed point theorems in a 2-Banach space, we investigate approximate solution for the generalized inhomogeneous radical quadratic functional equation of the form f(ax2+by2)=af(x)+bf(y)+D(x,y),$$f… Click to show full abstract
AbstractIn this paper, using Brzdȩk and Ciepliński’s fixed point theorems in a 2-Banach space, we investigate approximate solution for the generalized inhomogeneous radical quadratic functional equation of the form f(ax2+by2)=af(x)+bf(y)+D(x,y),$$f \bigl(\sqrt{ax^{2}+by^{2}} \bigr)=af(x)+bf(y) + D(x,y), $$ where f is a mapping on the set of real numbers, a,b∈R+$a, b\in\mathbf {R}_{+}$ and D(x,y)$D(x,y)$ is a given function. Some stability and hyperstability properties are presented.
Journal Title: Journal of Inequalities and Applications
Year Published: 2019
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