A new result on the distinctness of primitive sequences over Z(pq) modulo 2

Qunxiong Zheng; Wenfeng Qi

Paper 2010/622

A new result on the distinctness of primitive sequences over Z(pq) modulo 2

Qunxiong Zheng and Wenfeng Qi

Abstract

Let Z/(pq) be the integer residue ring modulo pq with odd prime numbers p and q. This paper studies the distinctness problem of modulo 2 reductions of two primitive sequences over Z/(pq), which has been studied by H.J. Chen and W.F. Qi in 2009. First, it is shown that almost every element in Z/(pq) occurs in a primitive sequence of order n > 2 over Z/(pq). Then based on this element distribution property of primitive sequences over Z/(pq), previous results are greatly improved and the set of primitive sequences over Z/(pq) that are known to be distinct modulo 2 is further enlarged.

Metadata

Available format(s): PDF
Category: Foundations
Publication info: Published elsewhere. Unknown where it was published
Keywords: integer residue rings linear recurring sequences primitive polynomials primitive sequences modular reduction
Contact author(s): qunxiong_zheng @ 163 com
History: 2010-12-08: received
Short URL: https://ia.cr/2010/622
License: CC BY

BibTeX

@misc{cryptoeprint:2010/622,
      author = {Qunxiong Zheng and Wenfeng Qi},
      title = {A new result on the distinctness of primitive sequences over Z(pq) modulo 2},
      howpublished = {Cryptology ePrint Archive, Paper 2010/622},
      year = {2010},
      note = {\url{https://eprint.iacr.org/2010/622}},
      url = {https://eprint.iacr.org/2010/622}
}