On the Functional Inequality f (x)f (y) - f (xy) ≤ f (x) plus f (y) - f (x plus y)

We prove that all solutions f : R -> R of the functional inequality (*) f (x) f (y) - f (xy) <= f (x) + f (y) - f (x + y), which are convex or concave on R and differentiable at 0 are given by f (x) = x and f (x) c, where 0 <= c <= 2. Moreover, we show that the only non-constant solution f : R -> R of (*), which is continuous on R and differentiable at 0 with f (0) = 0 is f (x) = x.