$C$-differentials, multiplicative uniformity and (almost) perfect $c$-nonlinearity
Abstract
In this paper we define a new (output) multiplicative differential, and the corresponding -differential uniformity. With this new concept, even for characteristic , there are perfect -nonlinear (PcN) functions. We first characterize the -differential uniformity of a function in terms of its Walsh transform. We further look at some of the known perfect nonlinear (PN) and show that only one remains a PcN function, under a different condition on the parameters. In fact, the -ary Gold PN function increases its -differential uniformity significantly, under some conditions on the parameters. We then precisely characterize the -differential uniformity of the inverse function (in any dimension and characteristic), relevant for the Rijndael (and Advanced Encryption Standard) block cipher.
Keywords
Cite
@article{arxiv.1909.03628,
title = {$C$-differentials, multiplicative uniformity and (almost) perfect $c$-nonlinearity},
author = {Pal Ellingsen and Patrick Felke and Constanza Riera and Pantelimon Stanica and Anton Tkachenko},
journal= {arXiv preprint arXiv:1909.03628},
year = {2019}
}
Comments
23 pages