The c-differential behavior of the inverse function under the EA-equivalence

Abstract

While the classical differential uniformity (c=1) is invariant under the CCZ-equivalence, the newly defined EFRST20 concept of c-differential uniformity, in general is not invariant under EA or CCZ-equivalence, as was observed in SPRS20. In this paper, we find an intriguing behavior of the inverse function, namely, that adding some appropriate linearized monomials increases the c-differential uniformity significantly, for some~c. For example, adding the linearized monomial xpd, where d is the largest nontrivial divisor of n, increases the mentioned c-differential uniformity from~2 or 3 (for c≠ 0) to ≥ pd+2, which in the case of AES' inverse function on 28 is a significant value of~18.