On Stability of the Equation of Homogeneous Functions on Topological Spaces

Let K be a cone of a linear space X and Y a sequentially complete locally convex linear topological Hausdorff space. Let f : K → Y and g: K→ Y satisfy $${\alpha }^{-1}f(\alpha x) - g(x) \in U,\quad \alpha \in A,\ x \in K,$$ where U is a bounded subset of Y and A ⊂ [1, ∞). Under some additional assumptions we prove that there exists exactly one positively homogeneous function F : K → Y such that the differences F − f and F ;− g are bounded on K, i.e. the equation of homogeneous functions is stable in the Ulam–Hyers sense.