International Association
for Cryptologic Research

At ASIACRYPT 2019, Zhang proposed a near collision attack on A5/1 claiming to recover the 64-bit A5/1 state with a time complexity around $2^{32}$ cipher ticks with negligible memory requirements. Soon after its proposal, Zhang's near collision attack was severely challenged by Derbez \etal who claimed that Zhang's attack cannot have a time complexity lower than Golic's memoryless guess-and-determine attack dating back to EUROCRYPT 1997. In this paper, we study both the guess-and-determine and the near collision attacks for recovering A5/1 states with negligible memory complexities. Firstly, we propose a new guessing technique called the \emph{move guessing technique} that can construct linear equation filters in a more efficient manner. Such a technique can be applied to both guess-and-determine and collision attacks for efficiency improvements. Secondly, we take the filtering strength of the linear equation systems into account for complexity analysis. Such filtering strength are evaluated with practical experiments making the complexities more convincing. Based on such new techniques, we are able to give 2 new guess-and-determine attacks on A5/1: the 1st attack recovers the internal state $\vec{s}^0$ with time complexity $2^{43.92}$; the 2nd one recovers a different state $\vec{s}^1$ with complexity $2^{43.25}$. We also revisit Golic's guess-and-determine attack and Zhang's near collision attacks. According to our detailed analysis, the complexity of Golic's $\vec{s}^1$ recovery attack is no lower than $2^{46.04}$, higher than the previously believed $2^{43}$. On the other hand, Zhang's near collision attack recovers $\vec{s}^0$ with the time complexity $2^{53.19}$: such a complexity can be further lowered to $2^{50.78}$ with our move guessing technique.