Binary $m$-sequences are ones with the largest period $n=2^m-1$ among the binary sequences produced by linear shift registers with length $m$. They have a wide range of applications in communication since they have several desirable pseudorandomness such as balance, uniform pattern distribution and ideal (classical) autocorrelation. In his reseach on arithmetic codes, Mandelbaum \cite{9Mand} introduces a 2-adic version of classical autocorrelation of binary sequences, called arithmetic autocorrelation. Later, Goresky and Klapper \cite{3G1,4G2,5G3,6G4} generalize this notion to nonbinary case and develop several properties of arithmetic autocorrelation related to linear shift registers with carry. Recently, Z. Chen et al. \cite{1C1} show an upper bound on arithmetic autocorrelation of binary $m$-sequences and raise a conjecture on absolute value distribution on arithmetic autocorrelation of binary $m$-sequences.
翻译:以美元计数的双线转移登记册生成的双轨序列中,以美元计时的最大时期为2美元=m美元-1美元。它们具有广泛的通信应用,因为它们具有若干可取的伪随机性,如平衡、统一模式分布和理想(古典)自动关系。在他关于算术代码的教学中, Mandelbaum\ cite{9Mand} 引入了2个版本的经典二进制序列自动关系, 称为算术自动调节。 后来, Goresky 和 Klapper\ cite{3G1, 4G2, 5G3, 6G4} 将这一概念概括为非双轨案例, 并开发与随附的线性转移登记册有关的数种计算自动属性。 最近, Z. Chen 等人\cite{cite{9C1} 展示了计算二进制元序列的自动调节关系上限, 并提升了对二进制美元序列的绝对值分布的预测值。