The 2-adic complexity of a class of binary sequences with almost optimal autocorrelation

Abstract

Pseudo-random sequences with good statistical property, such as low autocorrelation, high linear complexity and large 2-adic complexity, have been applied in stream cipher. In general, it is difficult to give both the linear complexity and 2-adic complexity of a periodic binary sequence. Cai and Ding Cai Ying gave a class of sequences with almost optimal autocorrelation by constructing almost difference sets. Wang Wang Qi proved that one type of those sequences by Cai and Ding has large linear complexity. Sun et al. Sun Yuhua showed that another type of sequences by Cai and Ding has also large linear complexity. Additionally, Sun et al. also generalized the construction by Cai and Ding using d-form function with difference-balanced property. In this paper, we first give the detailed autocorrelation distribution of the sequences was generalized from Cai and Ding Cai Ying by Sun et al. Sun Yuhua. Then, inspired by the method of Hu Hu Honggang, we analyse their 2-adic complexity and give a lower bound on the 2-adic complexity of these sequences. Our result show that the 2-adic complexity of these sequences is at least N-log2N+1 and that it reach N-1 in many cases, which are large enough to resist the rational approximation algorithm (RAA) for feedback with carry shift registers (FCSRs).