The c-differential properties of a class of power functions
Abstract
Power functions with low c-differential uniformity have been widely studied not only because of their strong resistance to multiplicative differential attacks, but also low implementation cost in hardware. Furthermore, the c-differential spectrum of a function gives a more precise characterization of its c-differential properties. Let f(x)=xpn+32 be a power function over the finite field Fpn, where p≠3 is an odd prime and n is a positive integer. In this paper, for all primes p≠3, by investigating certain character sums with regard to elliptic curves and computing the number of solutions of a system of equations over Fpn, we determine explicitly the (-1)-differential spectrum of f with a unified approach. We show that if pn 3 4, then f is a differentially (-1,3)-uniform function except for pn∈\7,19,23\ where f is an APcN function, and if pn 1 4, the (-1)-differential uniformity of f is equal to 4. In addition, an upper bound of the c-differential uniformity of f is also given.
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