Title :
Discrete Lyapunov Exponent and Differential Cryptanalysis
Author :
Jakimoski, G. ; Subbalakshmi, K.P.
Author_Institution :
Stevens Inst. of Technol., Hoboken
fDate :
6/1/2007 12:00:00 AM
Abstract :
Partly motivated by the developments in chaos-based block cipher design, a definition of the discrete Lyapunov exponent for an arbitrary permutation of a finite lattice was recently proposed. We explore the relation between the discrete Lyapunov exponent and the maximum differential probability of a bijective mapping (i.e., an S-box or the mapping defined by a block cipher). Our analysis shows that "good" encryption transformations have discrete Lyapunov exponents close to the discrete Lyapunov exponent of a mapping that has a perfect nonlinearity. The converse does not hold.
Keywords :
Lyapunov methods; chaotic communication; cryptography; probability; bijective mapping; chaos-based block cipher design; differential cryptanalysis; discrete Lyapunov exponent; encryption transformation; finite lattice; maximum differential probability; Application software; Chaos; Circuits; Cryptography; Digital systems; Lattices; Security; Upper bound; Block ciphers; Lyapunov exponent; chaotic maps; differential cryptanalysis; discrete chaos; maximum differential probability (DP);
Journal_Title :
Circuits and Systems II: Express Briefs, IEEE Transactions on
DOI :
10.1109/TCSII.2007.892214
