The original paper is in English. Non-English content has been machine-translated and may contain typographical errors or mistranslations. ex. Some numerals are expressed as "XNUMX".
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The original paper is in English. Non-English content has been machine-translated and may contain typographical errors or mistranslations. Copyrights notice
Inspirados por uma ideia de Levenshtein, aplicamos a restrição da zona de baixa correlação na análise da correlação aperiódica quadrática média ponderada. Em seguida, derivamos um limite inferior na medida para conjuntos de sequências quase complementares com zona de correlação baixa (LCZ-QCSS). Discutimos as condições de rigidez para o limite proposto. Acontece que o limite proposto é mais restrito do que o limite de Liu-Guan-Ng-Chen para LCZ-QCSS. Também derivamos um limite inferior para QCSS, o que melhora o limite Liu-Guan-Mow em geral.
Bing LIU
Southwest Jiaotong University
Zhengchun ZHOU
Southwest Jiaotong University
Udaya PARAMPALLI
University of Melbourne
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Bing LIU, Zhengchun ZHOU, Udaya PARAMPALLI, "A Tighter Correlation Lower Bound for Quasi-Complementary Sequence Sets with Low Correlation Zone" in IEICE TRANSACTIONS on Fundamentals,
vol. E104-A, no. 2, pp. 392-398, February 2021, doi: 10.1587/transfun.2020SDP0006.
Abstract: Inspired by an idea due to Levenshtein, we apply the low correlation zone constraint in the analysis of the weighted mean square aperiodic correlation. Then we derive a lower bound on the measure for quasi-complementary sequence sets with low correlation zone (LCZ-QCSS). We discuss the conditions of tightness for the proposed bound. It turns out that the proposed bound is tighter than Liu-Guan-Ng-Chen bound for LCZ-QCSS. We also derive a lower bound for QCSS, which improves the Liu-Guan-Mow bound in general.
URL: https://global.ieice.org/en_transactions/fundamentals/10.1587/transfun.2020SDP0006/_p
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@ARTICLE{e104-a_2_392,
author={Bing LIU, Zhengchun ZHOU, Udaya PARAMPALLI, },
journal={IEICE TRANSACTIONS on Fundamentals},
title={A Tighter Correlation Lower Bound for Quasi-Complementary Sequence Sets with Low Correlation Zone},
year={2021},
volume={E104-A},
number={2},
pages={392-398},
abstract={Inspired by an idea due to Levenshtein, we apply the low correlation zone constraint in the analysis of the weighted mean square aperiodic correlation. Then we derive a lower bound on the measure for quasi-complementary sequence sets with low correlation zone (LCZ-QCSS). We discuss the conditions of tightness for the proposed bound. It turns out that the proposed bound is tighter than Liu-Guan-Ng-Chen bound for LCZ-QCSS. We also derive a lower bound for QCSS, which improves the Liu-Guan-Mow bound in general.},
keywords={},
doi={10.1587/transfun.2020SDP0006},
ISSN={1745-1337},
month={February},}
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TY - JOUR
TI - A Tighter Correlation Lower Bound for Quasi-Complementary Sequence Sets with Low Correlation Zone
T2 - IEICE TRANSACTIONS on Fundamentals
SP - 392
EP - 398
AU - Bing LIU
AU - Zhengchun ZHOU
AU - Udaya PARAMPALLI
PY - 2021
DO - 10.1587/transfun.2020SDP0006
JO - IEICE TRANSACTIONS on Fundamentals
SN - 1745-1337
VL - E104-A
IS - 2
JA - IEICE TRANSACTIONS on Fundamentals
Y1 - February 2021
AB - Inspired by an idea due to Levenshtein, we apply the low correlation zone constraint in the analysis of the weighted mean square aperiodic correlation. Then we derive a lower bound on the measure for quasi-complementary sequence sets with low correlation zone (LCZ-QCSS). We discuss the conditions of tightness for the proposed bound. It turns out that the proposed bound is tighter than Liu-Guan-Ng-Chen bound for LCZ-QCSS. We also derive a lower bound for QCSS, which improves the Liu-Guan-Mow bound in general.
ER -