M. Rossafi

This paper is devoted to the study of hyperstability phenomena in the context of convex modular spaces. In particular, we investigate the hyperstability of three fundamental functional equations: the quadratic equation \begin{equation} \varphi(x+y)+\varphi(x-y)=2\varphi(x)+2\varphi(y) \end{equation} the general linear equation \begin{equation} \varphi(ax+by)=A\varphi(x)+B\varphi(y)+C \end{equation} and the $n$-dimensional quadratic equation \begin{equation} f\left(\sum_{i=1}^{m}x_{i}\right)+\sum_{1\leq i < j\leq m}f\big(x_{i}-x_{j}\big)=m\sum_{i=1}^{m}f(x_{i}). \end{equation} Using the direct method, we establish sufficient conditions under which every approximate solution of these equations in modular spaces coincides exactly with an exact solution. Our results extend earlier contributions obtained in Banach spaces via fixed point techniques, and provide new insights into the stability of functional equations in the broader context of modular spaces.

In this work, we prove the generalised Hyer Ulam stability of the following functional equation \begin{equation} \phi(x)+\phi(y)+\phi(z)=q \phi\left(\sqrt[s]{\frac{x^s+y^s+z^s}{q}}\right),\qquad |q| \leq 1 \end{equation} and $s$ is an odd integer such that $s\geq 3$, in modular space, using the direct method, and the fixed point theorem.

This paper aims to study the concept of weaving operator frames within Hilbert spaces $\mathcal{H}$. Properties of weaving operator frames are explored. An investigation into the dual aspect of weaving operator frames within $B(\mathcal{H})$ spaces is presented. The behavior and characteristics of weaving operator responses within the context of Hilbert spaces are discuted. Finally, perturbation results concerning weaving operator frames are obtained.

В статті вивчається концепція фреймів сплітаючих операторів в гільбертових просторах $\mathcal{H}$. Досліджуються властивості фреймів сплітаючих операторів. Вивчено подвійний аспект фреймів сплітаючих операторів в просторах $B(\mathcal{H})$. Обговорено поведінку та характеристики реакцій сплітаючего оператора в контексті гільбертових просторів. Отримано результати збурення фреймів сплітаючих операторів.