Cryptanalysis of a Generalized Unbalanced Feistel Network Structure

Abstract

This paper reevaluates the security of GF-NLFSR, a new kind of generalized unbalanced Feistel network structure that was proposed at ACISP 2009. We show that GF-NLFSR itself reveals a very slow diffusion rate, which could lead to several distinguishing attacks. For GF-NLFSR containing $n$ sub-blocks, we find an $n^2$-round integral distinguisher by algebraic methods and further use this integral to construct an $(n^2+n-2)$-round impossible differential distinguisher. Compared with the original $(3n-1)$-round integral and $(2n-1)$-round impossible differential, ours are significantly better. Another contribution of this paper is to introduce a kind of non-surjective attack by analyzing a variant structure of GF-NLFSR, whose provable security against differential and linear cryptanalysis can also be provided. The advantage of the proposed non-surjective attack is that traditional non-surjective attack is only applicable to Feistel ciphers with non-surjective (non-uniform) round functions, while ours could be applied to block ciphers with bijective ones. Moreover, its data complexity is $\mathcal{O}(l)$ with $l$ the block length