On a class of linear functional equations without range condition

Abstract

The main purpose of this work is to provide the general solutions of a class of linear functional equations. Let n≥ 2 be an arbitrarily fixed integer, let further X and Y be linear spaces over the field K and let αi, βi∈ K, i=1, …, n be arbitrarily fixed constants. We will describe all those functions f, fi, j X× Y K, i, j=1, …, n that fulfill functional equation \[ f(Σi=1n αi xi, Σi=1n βi yi)= Σi, j=1nfi, j(xi, yj) (xi ∈ X, yi ∈ Y, i=1, …, n). \] Additionally, necessary and sufficient conditions will also be given that guarantee the solutions to be non-trivial.