Boomerang uniformity of a class of power maps
Abstract
We consider the boomerang uniformity of an infinite class of (locally-APN) power maps and show that its boomerang uniformity over the finite field 2n is 2 and 4, when n 0 4 and n 2 4, respectively. As a consequence, we show that for this class of power maps, the differential uniformity is strictly greater than its boomerang uniformity.
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