New Characterizations for the Multi-output Correlation-Immune Boolean Functions
Abstract
Correlation-immune (CI) multi-output Boolean functions have the property of keeping the same output distribution when some input variables are fixed. Recently, a new application of CI functions has appeared in the system of resisting side-channel attacks (SCA). In this paper, three new methods are proposed to characterize the th-order CI multi-output Boolean functions (-input and -output). The first characterization is to regard the multi-output Boolean functions as the corresponding generalized Boolean functions. It is shown that a generalized Boolean functions is a th-order CI function if and only if the Walsh transform of defined here vanishes at all points with Hamming weights between and . Compared to the previous Walsh transforms of component functions, our first method can reduce the computational complexity from to . The last two methods are generalized from Fourier spectral characterizations. Especially, Fourier spectral characterizations are more efficient to characterize the symmetric multi-output CI Boolean functions.
Keywords
Cite
@article{arxiv.1903.05351,
title = {New Characterizations for the Multi-output Correlation-Immune Boolean Functions},
author = {Jinjin Chai and Zilong Wang and Sihem Mesnager and Guang Gong},
journal= {arXiv preprint arXiv:1903.05351},
year = {2019}
}