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Main Authors: Peng, Xiuping, Wu, Congying, Liu, Zilong, Li, Chunlei, Zhang, Jianye, Li, Xiangjun, Fan, Pingzhi
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2502.05853
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author Peng, Xiuping
Wu, Congying
Liu, Zilong
Li, Chunlei
Zhang, Jianye
Li, Xiangjun
Fan, Pingzhi
author_facet Peng, Xiuping
Wu, Congying
Liu, Zilong
Li, Chunlei
Zhang, Jianye
Li, Xiangjun
Fan, Pingzhi
contents This paper introduces a novel finite Zak transform (FZT)-aided framework for constructing multiple zero-correlation zone (ZCZ) sequence sets with optimal correlation properties. Specifically, each sequence is perfect with zero auto-correlation sidelobes, each ZCZ sequence set meets the Tang-Fan-Matsufuji bound with equality, and the maximum inter-set cross-correlation of multiple sequence sets meets the Sarwate bound with equality. Our study shows that these sequences can be sparsely expressed in the Zak domain through properly selected index and phase matrices. Particularly, it is found that the maximum inter-set cross-correlation beats the Sarwate bound if every index matrix is a circular Florentine array. Several construction methods of multiple ZCZ sequence sets are proposed, demonstrating both the optimality and high flexibility. {Additionally, it is shown that excellent synchronization performance can be achieved by the proposed sequences in orthogonal-time-frequency-space (OTFS) systems.
format Preprint
id arxiv_https___arxiv_org_abs_2502_05853
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Zak-Transform-Induced Optimal Sequences and Their Applications in OTFS
Peng, Xiuping
Wu, Congying
Liu, Zilong
Li, Chunlei
Zhang, Jianye
Li, Xiangjun
Fan, Pingzhi
Information Theory
This paper introduces a novel finite Zak transform (FZT)-aided framework for constructing multiple zero-correlation zone (ZCZ) sequence sets with optimal correlation properties. Specifically, each sequence is perfect with zero auto-correlation sidelobes, each ZCZ sequence set meets the Tang-Fan-Matsufuji bound with equality, and the maximum inter-set cross-correlation of multiple sequence sets meets the Sarwate bound with equality. Our study shows that these sequences can be sparsely expressed in the Zak domain through properly selected index and phase matrices. Particularly, it is found that the maximum inter-set cross-correlation beats the Sarwate bound if every index matrix is a circular Florentine array. Several construction methods of multiple ZCZ sequence sets are proposed, demonstrating both the optimality and high flexibility. {Additionally, it is shown that excellent synchronization performance can be achieved by the proposed sequences in orthogonal-time-frequency-space (OTFS) systems.
title Zak-Transform-Induced Optimal Sequences and Their Applications in OTFS
topic Information Theory
url https://arxiv.org/abs/2502.05853