The Differential and Boomerang Properties of a Class of Binomials
Abstract
Let q be an odd prime power with q 3\ (mod\ 4). In this paper, we study the differential and boomerang properties of the function F2,u(x)=x2(1+uη(x)) over Fq, where u∈Fq* and η is the quadratic character of Fq. We determine the differential uniformity of F2,u for any u∈Fq* and determine the differential spectra and boomerang uniformity of the locally-APN functions F2, 1, thereby disproving a conjecture proposed in budaghyan2024arithmetization which states that there exist infinitely many q and u such that F2,u is an APN function.
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