On the Cross-Correlation of a Ternary $m$-sequence of Period $3^{4k}-1$ and Its Decimated Sequence by $\frac{(3^{2k}+1)^{2}}{20}$

Details On the Cross-Correlation of a Ternary $m$-sequence of Period $3^{4k}-1$ and Its Decimated Sequence by $\frac{(3^{2k}+1)^{2}}{20}$ On the Cross-Correlation of a Ternary $m$-sequence of Period $3^{4k}-1$ and Its Decimated Sequence by $\frac{(3^{2k}+1)^{2}}{20}$

2011-05-13

arxiv.org/abs/1105.2786v1

Computer Science

Information Theory

Scientific paper

Let $d=\frac{(3^{2k}+1)^{2}}{20}$, where $k$ is an odd integer. We show that
the magnitude of the cross-correlation values of a ternary $m$-sequence
$\{s_{t}\}$ of period $3^{4k}-1$ and its decimated sequence $\{s_{dt}\}$ is
upper bounded by $5\sqrt{3^{n}}+1$, where $n=4k$.

Affiliated with

Also associated with

No associations

Rating

On the Cross-Correlation of a Ternary $m$-sequence of Period $3^{4k}-1$ and Its Decimated Sequence by $\frac{(3^{2k}+1)^{2}}{20}$ does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.

If you have personal experience with On the Cross-Correlation of a Ternary $m$-sequence of Period $3^{4k}-1$ and Its Decimated Sequence by $\frac{(3^{2k}+1)^{2}}{20}$, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and On the Cross-Correlation of a Ternary $m$-sequence of Period $3^{4k}-1$ and Its Decimated Sequence by $\frac{(3^{2k}+1)^{2}}{20}$ will most certainly appreciate the feedback.

Rate now

Comments { 0 }

Profile ID: LFWR-SCP-O-27944