Locally-APN Binomials with Low Boomerang Uniformity in Odd Characteristic

Abstract

Recently, several studies have shown that when q34, for certain choices of r, the function Fr(x)=xr+xr+q-12 defined over is locally-APN and has boomerang uniformity at most~2. In this paper, we extend these results by showing that if there is at most one x∈ with (x)=(x+1)=1 satisfying (x+1)r - xr = b for all b∈ and (r,q-1) 2, then Fr is locally-APN with boomerang uniformity at most 2. Moreover, we study the differential spectra of F3 and F2q-13, and the boomerang spectrum of F2 when p=3.

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