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Stability of an additive-quartic functional equation in modular spaces

S. Karthikeyan, C. Park, P. Palani, T. R. K. Kumar

2021Journal of Mathematics and Computer Science14 citationsDOIOpen Access PDF

Abstract

In this paper, we prove the Ulam-Hyers stability of the following additive-quartic functional equation \[ f\left(\frac{u+v}{2}-w\right) +f\left(\frac{v+w}{2}-u\right)+f\left(\frac{w+u}{2}-v\right) =\frac{25}{32}\left(f(u-v)+f(v-w)+f(w-u)\right)-\frac{7}{32}\left(f(v-u)+f(w-v)+f(u-w)\right) \] in modular spaces by using the direct method.

Topics & Concepts

Modular designQuartic functionStability (learning theory)MathematicsPure mathematicsComputer scienceProgramming languageMachine learningFunctional Equations Stability Results