Fourier Transforms and Bent Functions on Finite Abelian Group-Acted Sets

Abstract

Let G be a finite abelian group acting faithfully on a finite set X. As a natural generalization of the perfect nonlinearity of Boolean functions, the G-bentness and G-perfect nonlinearity of functions on X are studied by Poinsot et al. [6,7] via Fourier transforms of functions on G. In this paper we introduce the so-called G-dual set X of X, which plays the role similar to the dual group G of G, and the Fourier transforms of functions on X, a generalization of the Fourier transforms of functions on finite abelian groups. Then we characterize the bent functions on X in terms of their own Fourier transforms on X. Bent (perfect nonlinear) functions on finite abelian groups and G-bent (G-perfect nonlinear) functions on X are treated in a uniform way in this paper, and many known results in [4,2,6,7] are obtained as direct consequences. Furthermore, we will prove that the bentness of a function on X can be determined by its distance from the set of G-linear functions. In order to explain the main results clearly, examples are also presented.