Holomorphic solutions of an inhomogeneous Cauchy equation.
Let K be a closed convex cone with nonempty interior in a real Banach space and let cc(K) denote the family of all nonempty convex compact subsets of K. A family of continuous linear set-valued functions is a differentiable iteration semigroup with F⁰(x) = x for x ∈ K if and only if the set-valued function is a solution of the problem , Φ(0,x) = x, for x ∈ K and t ≥ 0, where denotes the Hukuhara derivative of Φ(t,x) with respect to t and for x ∈ K.
We discuss the Hyers-Ulam stability of the nonlinear iterative equation . By constructing uniformly convergent sequence of functions we prove that this equation has a unique solution near its approximate solution.