More characterizations of generalized bent function in odd characteristic, their dual and the gray image

Abstract

In this paper, we further investigate properties of generalized bent Boolean functions from pn to pk, where p is an odd prime and k is a positive integer. For various kinds of representations, sufficient and necessary conditions for bent-ness of such functions are given in terms of their various kinds of component functions. Furthermore, a subclass of gbent functions corresponding to relative difference sets, which we call pk-bent functions, are studied. It turns out that pk-bent functions correspond to a class of vectorial bent functions, and the property of being pk-bent is much stronger then the standard bent-ness. The dual and the generalized Gray image of gbent function are also discussed. In addition, as a further generalization, we also define and give characterizations of gbent functions from pln to pk for a positive integer l with l<k.