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Sets of Low Correlation Sequences from Cyclotomy

Information Theory 2021-12-30 v1 Discrete Mathematics Signal Processing Combinatorics math.IT Number Theory

Abstract

Low correlation (finite length) sequences are used in communications and remote sensing. One seeks codebooks of sequences in which each sequence has low aperiodic autocorrelation at all nonzero shifts, and each pair of distinct sequences has low aperiodic crosscorrelation at all shifts. An overall criterion of codebook quality is the demerit factor, which normalizes all sequences to unit Euclidean norm, sums the squared magnitudes of all the correlations between every pair of sequences in the codebook (including sequences with themselves to cover autocorrelations), and divides by the square of the number of sequences in the codebook. This demerit factor is expected to be 1+1/N1/(N)1+1/N-1/(\ell N) for a codebook of NN randomly selected binary sequences of length \ell, but we want demerit factors much closer to the absolute minimum value of 11. For each NN such that there is an N×NN\times N Hadamard matrix, we use cyclotomy to construct an infinite family of codebooks of binary sequences, in which each codebook has N1N-1 sequences of length pp, where pp runs through the primes with Np1N\mid p-1. As pp tends to infinity, the demerit factor of the codebooks tends to 1+1/(6(N1))1+1/(6(N-1)), and the maximum magnitude of the undesirable correlations (crosscorrelations between distinct sequences and off-peak autocorrelations) is less than a small constant times plog(p)\sqrt{p}\log(p). This construction also generalizes to nonbinary sequences.

Keywords

Cite

@article{arxiv.2112.14719,
  title  = {Sets of Low Correlation Sequences from Cyclotomy},
  author = {Jonathan M. Castello and Daniel J. Katz and Jacob M. King and Alain Olavarrieta},
  journal= {arXiv preprint arXiv:2112.14719},
  year   = {2021}
}

Comments

52 pages

R2 v1 2026-06-24T08:35:03.832Z