Non Abelian Bent Functions

Abstract

Perfect nonlinear functions from a finite group G to another one H are those functions f: G → H such that for all nonzero α ∈ G, the derivative dαf: x f(α x) f(x)-1 is balanced. In the case where both G and H are Abelian groups, f: G → H is perfect nonlinear if and only if f is bent i.e for all nonprincipal character of H, the (discrete) Fourier transform of f has a constant magnitude equals to |G|. In this paper, using the theory of linear representations, we exhibit similar bentness-like characterizations in the cases where G and/or H are (finite) non Abelian groups. Thus we extend the concept of bent functions to the framework of non Abelian groups.