Title :
On the correlations between a combining function and functions of fewer variables
Author_Institution :
Projet CODES, INRIA, Le Chesnay, France
Abstract :
The Hamming distance of a Boolean function to the functions having many linear structures is an important cryptographic parameter. Most notably, the accuracy of the approximation of the combining function by a function of fewer variables is a major issue in most attacks against combination generators. Here, we show that the distance of a function to the functions having a k-dimensional linear space is highly related to its nonlinearity. In particular, we prove that there is no accurate approximation of any highly nonlinear function by a function depending on a small subset of its input variables.
Keywords :
Boolean functions; correlation theory; cryptography; nonlinear functions; Boolean function; Hamming distance; bent functions; combination generators; combining function; correlation attacks; cryptanalysis; cryptographic parameter; highly nonlinear function; input variables; k-dimensional linear space; Boolean functions; Cryptography; Filtering; Hamming distance; Input variables; Linear code; Linear feedback shift registers; Nonlinear filters;
Conference_Titel :
Information Theory Workshop, 2002. Proceedings of the 2002 IEEE
Print_ISBN :
0-7803-7629-3
DOI :
10.1109/ITW.2002.1115421
