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http://dx.doi.org/10.4134/JKMS.j160272

A MEASURE ZERO STABILITY OF A FUNCTIONAL EQUATION ASSOCIATED WITH INNER PRODUCT SPACE  

Chun, Jaeyoung (Department of Mathematics Kunsan National University)
Rassias, John Michael (Pedagogical Department E. E., Section of Mathematics and Informatics National and Capodistrian University of Athens)
Publication Information
Journal of the Korean Mathematical Society / v.54, no.2, 2017 , pp. 697-711 More about this Journal
Abstract
Let X, Y be real normed vector spaces. We exhibit all the solutions $f:X{\rightarrow}Y$ of the functional equation f(rx + sy) + rsf(x - y) = rf(x) + sf(y) for all $x,y{\in}X$, where r, s are nonzero real numbers satisfying r + s = 1. In particular, if Y is a Banach space, we investigate the Hyers-Ulam stability problem of the equation. We also investigate the Hyers-Ulam stability problem on a restricted domain of the following form ${\Omega}{\cap}\{(x,y){\in}X^2:{\parallel}x{\parallel}+{\parallel}y{\parallel}{\geq}d\}$, where ${\Omega}$ is a rotation of $H{\times}H{\subset}X^2$ and $H^c$ is of the first category. As a consequence, we obtain a measure zero Hyers-Ulam stability of the above equation when $f:\mathbb{R}{\rightarrow}Y$.
Keywords
Baire category theorem; first category; Lebesgue measure; quadratic functional equation; (r, s)-quasi-quadratic functional equation; second category; Hyers-Ulam stability;
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