Paper 2012/003
On the distinctness of binary sequences derived from primitive sequences modulo square-free odd integers
Qun-Xiong Zheng, Wen-Feng Qi, and Tian Tian
Abstract
Let M be a square-free odd integer and Z/(M) the integer residue ring modulo M. This paper studies the distinctness of primitive sequences over Z/(M) modulo 2. Recently, for the case of M = pq, a product of two distinct prime numbers p and q, the problem has been almost completely solved. As for the case that M is a product of more prime numbers, the problem has been quite resistant to proof. In this paper, a partial proof is given by showing that a class of primitive sequences of order 2k+1 over Z/(M) is distinct modulo 2. Besides as an independent interest, the paper also involves two distribution properties of primitive sequences over Z/(M), which related closely to our main results.
Note: The manuscript was summitted to IEEE Transactions on Information Theory in Aug. 2011.
Metadata
- Available format(s)
- Category
- Foundations
- Publication info
- Published elsewhere. Unknown where it was published
- Keywords
- integer residue ringslinear recurring sequencesprimitive polynomialsprimitive sequencesmodular reduction
- Contact author(s)
- qunxiong_zheng @ 163 com
- History
- 2012-01-05: received
- Short URL
- https://ia.cr/2012/003
- License
-
CC BY
BibTeX
@misc{cryptoeprint:2012/003, author = {Qun-Xiong Zheng and Wen-Feng Qi and Tian Tian}, title = {On the distinctness of binary sequences derived from primitive sequences modulo square-free odd integers}, howpublished = {Cryptology {ePrint} Archive, Paper 2012/003}, year = {2012}, url = {https://eprint.iacr.org/2012/003} }