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 -error linear complexity of pseudorandom binary sequences of period derived from the Euler quotients modulo , a power of an odd prime for . When , this is just the case of polynomial quotients (including Fermat quotients) modulo , which has been studied in an earlier work of Chen, Niu and Wu. In this work, we establish a recursive relation on the -error linear complexity of the sequences for the case of . We also state the exact values of the -error linear complexity for the case of . From the results, we can find that the -error linear complexity of the sequences (of period ) does not decrease dramatically for .
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}
}