English

Characterization of $2^n$-periodic binary sequences with fixed 3-error or 4-error linear complexity

Cryptography and Security 2011-12-30 v1

Abstract

The linear complexity and the kk-error linear complexity of a sequence have been used as important security measures for key stream sequence strength in linear feedback shift register design. By using the sieve method of combinatorics, the kk-error linear complexity distribution of 2n2^n-periodic binary sequences is investigated based on Games-Chan algorithm. First, for k=2,3k=2,3, the complete counting functions on the kk-error linear complexity of 2n2^n-periodic binary sequences with linear complexity less than 2n2^n are characterized. Second, for k=3,4k=3,4, the complete counting functions on the kk-error linear complexity of 2n2^n-periodic binary sequences with linear complexity 2n2^n are presented. Third, for k=4,5k=4,5, the complete counting functions on the kk-error linear complexity of 2n2^n-periodic binary sequences with linear complexity less than 2n2^n are derived. As a consequence of these results, the counting functions for the number of 2n2^n-periodic binary sequences with the 3-error linear complexity are obtained, and the complete counting functions on the 4-error linear complexity of 2n2^n-periodic binary sequences are obvious.

Keywords

Cite

@article{arxiv.1112.6047,
  title  = {Characterization of $2^n$-periodic binary sequences with fixed 3-error or 4-error linear complexity},
  author = {Jianqin Zhou and Jun Liu and Wanquan Liu},
  journal= {arXiv preprint arXiv:1112.6047},
  year   = {2011}
}

Comments

7 pages

R2 v1 2026-06-21T19:57:31.400Z