English

On $k$-error linear complexity of pseudorandom binary sequences derived from Euler quotients

Cryptography and Security 2018-10-05 v2 Number Theory

Abstract

We investigate the kk-error linear complexity of pseudorandom binary sequences of period prp^{\mathfrak{r}} derived from the Euler quotients modulo pr1p^{\mathfrak{r}-1}, a power of an odd prime pp for r2\mathfrak{r}\geq 2. When r=2\mathfrak{r}=2, this is just the case of polynomial quotients (including Fermat quotients) modulo pp, which has been studied in an earlier work of Chen, Niu and Wu. In this work, we establish a recursive relation on the kk-error linear complexity of the sequences for the case of r3\mathfrak{r}\geq 3. We also state the exact values of the kk-error linear complexity for the case of r=3\mathfrak{r}=3. From the results, we can find that the kk-error linear complexity of the sequences (of period prp^{\mathfrak{r}}) does not decrease dramatically for k<pr2(p1)2/2k<p^{\mathfrak{r}-2}(p-1)^2/2.

Cite

@article{arxiv.1803.03339,
  title  = {On $k$-error linear complexity of pseudorandom binary sequences derived from Euler quotients},
  author = {Zhixiong Chen and Vladimir Edemskiy and Pinhui Ke and Chenhuang Wu},
  journal= {arXiv preprint arXiv:1803.03339},
  year   = {2018}
}
R2 v1 2026-06-23T00:47:13.984Z