A note on the differential spectrum of the Ness-Helleseth function

Abstract

Let n≥slant3 be an odd integer and u an element in the finite field 3n. The Ness-Helleseth function is the binomial fu(x)=uxd1+xd2 over 3n, where d1=3n-12-1 and d2=3n-2. In 2007, Ness and Helleseth showed that fu is an APN function when (u+1)=(u-1)=(u), is differentially 3-uniform when (u+1)=(u-1)≠(u), and has differential uniformity at most 4 if (u+1)≠(u-1) and u3. Here (·) denotes the quadratic character on 3n. Recently, Xia et al. determined the differential uniformity of fu for all u and computed the differential spectrum of fu for u satisfying (u+1)=(u-1) or u∈3. The remaining problem is the differential spectrum of fu with (u+1)≠(u-1) and u3. In this paper, we fill in the gap. By studying differential equations arising from the Ness-Helleseth function fu more carefully, we express the differential spectrum of fu for such u in terms of two quadratic character sums. This complements the previous work of Xia et al.