Almost-Polyphase Sequences with Good Correlation Property from Sidelnikov Sequences 


Vol. 45,  No. 8, pp. 1323-1328, Aug.  2020
10.7840/kics.2020.45.8.1323


PDF Full-Text
  Abstract

Let q be a power of a prime and let k be a divisor of q-1. We propose a construction of an almost-polyphase sequence set of size k-1 and of period q-1 using a k-ary Sidelnikov sequence of period q-1. we prove that the out-of-phase autocorrelation magnitude of the sequences in the set is upper-bounded by 2 and the crosscorrelation magnitude is upper bounded by √q+1.

  Statistics
Cumulative Counts from November, 2022
Multiple requests among the same browser session are counted as one view. If you mouse over a chart, the values of data points will be shown.


  Cite this article

[IEEE Style]

M. H. Lee, G. Kim, H. Song, "Almost-Polyphase Sequences with Good Correlation Property from Sidelnikov Sequences," The Journal of Korean Institute of Communications and Information Sciences, vol. 45, no. 8, pp. 1323-1328, 2020. DOI: 10.7840/kics.2020.45.8.1323.

[ACM Style]

Min Hyung Lee, Gangsan Kim, and Hong-Yeop Song. 2020. Almost-Polyphase Sequences with Good Correlation Property from Sidelnikov Sequences. The Journal of Korean Institute of Communications and Information Sciences, 45, 8, (2020), 1323-1328. DOI: 10.7840/kics.2020.45.8.1323.

[KICS Style]

Min Hyung Lee, Gangsan Kim, Hong-Yeop Song, "Almost-Polyphase Sequences with Good Correlation Property from Sidelnikov Sequences," The Journal of Korean Institute of Communications and Information Sciences, vol. 45, no. 8, pp. 1323-1328, 8. 2020. (https://doi.org/10.7840/kics.2020.45.8.1323)

Search
(IN TITLE, AUTHOR, ABSTRACT,KEYWORDS)

Advanced Search

POPULAR KEYWORDS
(TOP 10 KEYWORDS)

Recent Publications
(LAST 3 YEARS)






pISSN : 1226 - 4717
eISSN : 2287 - 3880