The Differential Spectrum of the Power Mapping xpn-3

Abstract

Let n be a positive integer and p a prime. The power mapping xpn-3 over Fpn has desirable differential properties, and its differential spectra for p=2,\,3 have been determined. In this paper, for any odd prime p, by investigating certain quadratic character sums and some equations over Fpn, we determine the differential spectrum of xpn-3 with a unified approach. The obtained result shows that for any given odd prime p, the differential spectrum can be expressed explicitly in terms of n. Compared with previous results, a special elliptic curve over Fp plays an important role in our computation for the general case p 5.