On -1-differential uniformity of ternary APN power functions

Abstract

Very recently, a new concept called multiplicative differential and the corresponding c-differential uniformity were introduced by Ellingsen et al. A function F(x) over finite field GF(pn) to itself is called c-differential uniformity δ, or equivalent, F(x) is differentially (c,δ) uniform, when the maximum number of solutions x∈GF(pn) of F(x+a)-F(cx)=b, a,b,c∈GF(pn), c≠1 if a=0, is equal to δ. The objective of this paper is to study the -1-differential uniformity of ternary APN power functions F(x)=xd over GF(3n). We obtain ternary power functions with low -1-differential uniformity, and some of them are almost perfect -1-nonlinear.

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