English

4-Adic Complexity of Interleaved Quaternary Sequences

Information Theory 2021-09-29 v2 math.IT

Abstract

Tang and Ding \cite{X. Tang} present a series of quaternary sequences w(a,b)w(a, b) interleaved by two binary sequences aa and bb with ideal autocorrelation and show that such interleaved quaternary sequences have optimal autocorrelation. In this paper we consider the 4-adic complexity FCw(4)FC_{w}(4) of such quaternary sequence w=w(a,b)w=w(a, b). We present a general formula on FCw(4)FC_{w}(4), w=w(a,b)w=w(a, b). As a direct consequence, we obtain a general lower bound FCw(4)log4(4n1)FC_{w}(4)\geq\log_{4}(4^{n}-1) where 2n2n is the period of the sequence ww. By taking aa and bb to be several types of known binary sequences with ideal autocorrelation (mm-sequences, twin-prime, Legendre, Hall sequences and their complement, shift or sample sequences), we compute the exact values of FCw(4)FC_{w}(4), w=w(a,b)w=w(a, b) and show that in most cases FCw(4)FC_{w}(4) reaches or nearly reaches the maximum value log4(42n1)\log_{4}(4^{2n}-1). Our results show that the 4-adic complexity of the quaternary sequences defined in \cite{X. Tang} are large enough to resist the attack of the rational approximation algorithm.

Keywords

Cite

@article{arxiv.2105.13826,
  title  = {4-Adic Complexity of Interleaved Quaternary Sequences},
  author = {Shiyuan Qiang and Xiaoyan Jing and Minghui Yang and Keqin Feng},
  journal= {arXiv preprint arXiv:2105.13826},
  year   = {2021}
}
R2 v1 2026-06-24T02:34:20.696Z