Quantum impossible differential and truncated differential cryptanalysis (1712.06997v2)

Abstract: Traditional cryptography is suffering a huge threat from the development of quantum computing. While many currently used public-key cryptosystems would be broken by Shor's algorithm, the effect of quantum computing on symmetric ones is still unclear. The security of symmetric ciphers relies heavily on the development of cryptanalytic tools. Thus, in order to accurately evaluate the security of symmetric primitives in the post-quantum world, it is significant to improve classical cryptanalytic methods using quantum algorithms. In this paper, we focus on two variants of differential cryptanalysis: truncated differential cryptanalysis and impossible differential cryptanalysis. Based on the fact that Bernstein-Vazirani algorithm can be used to find the linear structures of Boolean functions, we propose two quantum algorithms that can be used to find high-probability truncated differentials and impossible differentials of block ciphers, respectively. We rigorously prove the validity of the algorithms and analyze their complexity. Our algorithms treat all rounds of the reduced cipher as a whole and only concerns the input and output differences at its both ends, instead of specific differential characteristics. Therefore, to a certain extent, they alleviate the weakness of conventional differential cryptanalysis, namely the difficulties in finding differential characteristics as the number of rounds increases.