A New Lower Bound on the Maximum Correlation of a Set with Mismatched Filters

Uy Hour Tan; Fabien Arlery; Olivier Rabaste; Frederic Lehmann; Jean Philippe Ovarlez

doi:10.1109/TIT.2020.3002066

A New Lower Bound on the Maximum Correlation of a Set with Mismatched Filters

Uy Hour Tan
, Fabien Arlery
, Olivier Rabaste
, Frederic Lehmann
, Jean Philippe Ovarlez

Research output: Contribution to journal › Article › peer-review

Abstract

A new lower bound is proposed in this article. Like Levenshtein bound, it relates to the maximum correlation value (autocorrelation and cross-correlation) a set of sequences can achieve. The novelty introduced here is that each sequence is associated with a mismatched filter. The proposed bound is inspired from Levenshtein's, holds for any set of unimodular sequences and can be applied in both aperiodic and periodic cases. It appears that the obtained expression does not deviate a lot from the (matched) Levenshtein, which indicates that the use of a mismatched filter will not guarantee much better sidelobe performance, as the number fo sequences is significant, contrary to the popular belief.

Original language	English
Article number	9115713
Pages (from-to)	6555-6565
Number of pages	11
Journal	IEEE Transactions on Information Theory
Volume	66
Issue number	10
DOIs	https://doi.org/10.1109/TIT.2020.3002066
Publication status	Published - 1 Oct 2020
Externally published	Yes

Keywords

Aperiodic correlation lower bound
Levenshtein bound
Welch bound
correlation
mismatched filter
periodic correlation lower bound

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10.1109/TIT.2020.3002066

Cite this

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title = "A New Lower Bound on the Maximum Correlation of a Set with Mismatched Filters",

abstract = "A new lower bound is proposed in this article. Like Levenshtein bound, it relates to the maximum correlation value (autocorrelation and cross-correlation) a set of sequences can achieve. The novelty introduced here is that each sequence is associated with a mismatched filter. The proposed bound is inspired from Levenshtein's, holds for any set of unimodular sequences and can be applied in both aperiodic and periodic cases. It appears that the obtained expression does not deviate a lot from the (matched) Levenshtein, which indicates that the use of a mismatched filter will not guarantee much better sidelobe performance, as the number fo sequences is significant, contrary to the popular belief.",

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author = "Tan, \{Uy Hour\} and Fabien Arlery and Olivier Rabaste and Frederic Lehmann and Ovarlez, \{Jean Philippe\}",

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AU - Tan, Uy Hour

AU - Arlery, Fabien

AU - Rabaste, Olivier

AU - Lehmann, Frederic

AU - Ovarlez, Jean Philippe

PY - 2020/10/1

Y1 - 2020/10/1

N2 - A new lower bound is proposed in this article. Like Levenshtein bound, it relates to the maximum correlation value (autocorrelation and cross-correlation) a set of sequences can achieve. The novelty introduced here is that each sequence is associated with a mismatched filter. The proposed bound is inspired from Levenshtein's, holds for any set of unimodular sequences and can be applied in both aperiodic and periodic cases. It appears that the obtained expression does not deviate a lot from the (matched) Levenshtein, which indicates that the use of a mismatched filter will not guarantee much better sidelobe performance, as the number fo sequences is significant, contrary to the popular belief.

AB - A new lower bound is proposed in this article. Like Levenshtein bound, it relates to the maximum correlation value (autocorrelation and cross-correlation) a set of sequences can achieve. The novelty introduced here is that each sequence is associated with a mismatched filter. The proposed bound is inspired from Levenshtein's, holds for any set of unimodular sequences and can be applied in both aperiodic and periodic cases. It appears that the obtained expression does not deviate a lot from the (matched) Levenshtein, which indicates that the use of a mismatched filter will not guarantee much better sidelobe performance, as the number fo sequences is significant, contrary to the popular belief.

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KW - Levenshtein bound

KW - Welch bound

KW - correlation

KW - mismatched filter

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JO - IEEE Transactions on Information Theory

JF - IEEE Transactions on Information Theory

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ER -

A New Lower Bound on the Maximum Correlation of a Set with Mismatched Filters

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Keywords

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