On pexider additive functional equations

Absztrakt

Let Y(+) egy Abelian group, D in Z² ( Z(+,≤) denotes the ordered group of the integers).
D_x:={uϵZ | exists vϵ X; (u,v)ϵ D}, D_y:={vϵZ | exists uϵ X; (u,v)ϵ D}, D_x+y:={zϵZ | exists (u,v)ϵ D; z=u+v}.The aim of the article is to find sets D in Z² that the general solution of the functional equation f(x+y) = g(x) + h(y) ((x,y ϵ D) with unknown functions f, g and h is in the form of f(u)=a(u)+C₁+C₂ (uϵD_x+y), g(v)=a(v)+C₁ (vϵD_x); h(z)=a(z)+C₂ (zϵD_y) where a is an additive function, C₁, C₂ ϵ Y are constants).