Further Investigation on Differential Properties of the Generalized Ness-Helleseth Function

Abstract

Let n be an odd positive integer, p be a prime with p34, d1 = pn-1 2 -1 and d2 =pn-2. The function defined by fu(x)=uxd1+xd2 is called the generalized Ness-Helleseth function over Fpn, where u∈Fpn. It was initially studied by Ness and Helleseth in the ternary case. In this paper, for pn 3 4 and pn 7, we provide the necessary and sufficient condition for fu(x) to be an APN function. In addition, for each u satisfying (u+1) = (u-1), the differential spectrum of fu(x) is investigated, and it is expressed in terms of some quadratic character sums of cubic polynomials, where (·) denotes the quadratic character of Fpn.