On the existence of aggregation functions with given super-additive and sub-additive transformations

Abstract

In this note we study restrictions on the recently introduced super-additive and sub-additive transformations, A A* and A A*, of an aggregation function A. We prove that if A* has a slightly stronger property of being strictly directionally convex, then A=A* and A* is linear; dually, if A* is strictly directionally concave, then A=A* and A* is linear. This implies, for example, the existence of pairs of functions f g sub-additive and super-additive on [0,∞[n, respectively, with zero value at the origin and satisfying relatively mild extra conditions, for which there exists no aggregation function A on [0,∞[n such that A*=f and A*=g.