In this paper, we determine the general solutions of the functional equation f(ux + (L − 1)vy, xv + yu + (L − 2)yv) = g(x, y) h(u, v), where f, g, h : K2 --- and gt; K are unknown functions and L in K* := K \ {0}, where K = R (resp. C) the real (resp. complexe) field. We also treat the functional equation f(ux + (L − 1)vy, xv + yu + (L − 2)yv, zw + (μ −1)ts, zs+tw+(μ−2)ts) = g(x, y, z, t) h(u, v,w, s), where f, g, h : K4 --- and gt; K are unknown functions. We do not require any continuity condition on the unknown functions. This paper may be considered as a continuation to the paper [2]
12. f (ax, ay) = aβf (x, y). Homogeneity equation. Here, a is an arbitrary number (a ≠ 0) and β is ...
The aim of this paper is to obtain the general solution of a reciprocal functional equation of the f...
Let f:]0, ∞[→ ℝ be a real valued function on the set of positive reals. Then the functional equation...
. We consider the functional equation f(xy) + f(x + y) = f(xy + x) + f(y) and its pexiderized versio...
Abstract. In this note we give the general solution of the functional equation f (x) f (x+ y) = f (...
8. f (x) + g(y) = h(x + y). Pexider’s equation. Here, the functions f (x), g(y), and h(z) are unkno...
Abstract. Consider the functional equation f, g, h, k: G → K, f(xy) + g(xy−1) = h(x)k(y) (∗) where ...
AbstractThis paper treats the following type of nonlinear functional equationsφ(x)=mH(x,φ[g(x)])Hφ(x...
AbstractThe present work aims to determine the solution f:R2→R of the equation f(ux−vy,uy−vx)=f(x,y)...
In this note, for any given real numbers a, b, c, we determine all the solutions f: R − → R of the f...
[[abstract]]Let G be an abelian group, C be the field of complex numbers, and 0 6≠α∈ G be a fixed el...
AbstractIn this paper, we obtain the general solution and stability of the Cauchy–Jensen functional ...
AbstractIn this paper, we obtain the general solution and the stability of the 2-variable quadratic ...
We consider a functional equation of the form G(x, phi(f1(x)), ..., phi(fr(x))) = c in the unknown f...
This is an expository paper containing remarks on solutions to some functional equations of a form, ...
12. f (ax, ay) = aβf (x, y). Homogeneity equation. Here, a is an arbitrary number (a ≠ 0) and β is ...
The aim of this paper is to obtain the general solution of a reciprocal functional equation of the f...
Let f:]0, ∞[→ ℝ be a real valued function on the set of positive reals. Then the functional equation...
. We consider the functional equation f(xy) + f(x + y) = f(xy + x) + f(y) and its pexiderized versio...
Abstract. In this note we give the general solution of the functional equation f (x) f (x+ y) = f (...
8. f (x) + g(y) = h(x + y). Pexider’s equation. Here, the functions f (x), g(y), and h(z) are unkno...
Abstract. Consider the functional equation f, g, h, k: G → K, f(xy) + g(xy−1) = h(x)k(y) (∗) where ...
AbstractThis paper treats the following type of nonlinear functional equationsφ(x)=mH(x,φ[g(x)])Hφ(x...
AbstractThe present work aims to determine the solution f:R2→R of the equation f(ux−vy,uy−vx)=f(x,y)...
In this note, for any given real numbers a, b, c, we determine all the solutions f: R − → R of the f...
[[abstract]]Let G be an abelian group, C be the field of complex numbers, and 0 6≠α∈ G be a fixed el...
AbstractIn this paper, we obtain the general solution and stability of the Cauchy–Jensen functional ...
AbstractIn this paper, we obtain the general solution and the stability of the 2-variable quadratic ...
We consider a functional equation of the form G(x, phi(f1(x)), ..., phi(fr(x))) = c in the unknown f...
This is an expository paper containing remarks on solutions to some functional equations of a form, ...
12. f (ax, ay) = aβf (x, y). Homogeneity equation. Here, a is an arbitrary number (a ≠ 0) and β is ...
The aim of this paper is to obtain the general solution of a reciprocal functional equation of the f...
Let f:]0, ∞[→ ℝ be a real valued function on the set of positive reals. Then the functional equation...