E. Elqorachi, M. Akkouchi
Abstract:
We study the Hyers-Ulam stability problem for the Cauchy and Wilson integral
equations
\begin{gather*}
\int_{G}f(xty)d\mu(t)=f(x)g(y),\;\;x,y\in G,\\
\int_{G}f(xty)d\mu(t)+\int_{G}f(xt\sigma(y))d\mu(t)=2f(x)g(y),
\;\;x,y\in G,
\end{gather*}
where $G$ is a topological group, $f$, $g$ : $G\rightarrow \mathbb{C}$ are
continuous functions, $\mu$ is a complex measure with compact support and
$\sigma$ is a continuous involution of $G$. The result obtained in this paper
are natural extensions of the previous works concerning the Hyers-Ulam stability
of the Cauchy and Wilson functional equations done in the particular case of $\mu$=$\delta_{e}$:
The Dirac measure concentrated at the identity element of $G$.
Keywords:
Topological group, Hyers--Ulam stability, Superstability, Cauchy equation,
D'Alembert equation, Wilson equation.
MSC 2000: 39B72.