Optimal Construction of Frequency-Hopping Sequence Sets with Low-Hit-Zone under Periodic Partial Hamming Correlation
Summary :
In this paper, a new class of low-hit-zone (LHZ) frequency-hopping sequence sets (LHZ FHS sets) is constructed based upon the Cartesian product, and the periodic partial Hamming correlation within its LHZ are studied. Studies have shown that the new LHZ FHS sets are optimal according to the periodic partial Hamming correlation bounds of FHS set, and some known FHS sets are the special cases of this new construction.
- Publication
- IEICE TRANSACTIONS on Fundamentals Vol.E100-A No.1 pp.304-307
- Publication Date
- 2017/01/01
- Publicized
- Online ISSN
- 1745-1337
- DOI
- 10.1587/transfun.E100.A.304
- Type of Manuscript
- LETTER
- Category
- Cryptography and Information Security
Authors
Changyuan WANG
Southwest Jiaotong University
Daiyuan PENG
Southwest Jiaotong University
Xianhua NIU
Xihua University
Hongyu HAN
Southwest Jiaotong University
Keyword
Latest Issue
Copyrights notice of machine-translated contents
The copyright of the original papers published on this site belongs to IEICE. Unauthorized use of the original or translated papers is prohibited. See IEICE Provisions on Copyright for details.
Cite this
Copy
Changyuan WANG, Daiyuan PENG, Xianhua NIU, Hongyu HAN, "Optimal Construction of Frequency-Hopping Sequence Sets with Low-Hit-Zone under Periodic Partial Hamming Correlation" in IEICE TRANSACTIONS on Fundamentals,
vol. E100-A, no. 1, pp. 304-307, January 2017, doi: 10.1587/transfun.E100.A.304.
Abstract: In this paper, a new class of low-hit-zone (LHZ) frequency-hopping sequence sets (LHZ FHS sets) is constructed based upon the Cartesian product, and the periodic partial Hamming correlation within its LHZ are studied. Studies have shown that the new LHZ FHS sets are optimal according to the periodic partial Hamming correlation bounds of FHS set, and some known FHS sets are the special cases of this new construction.
URL: https://global.ieice.org/en_transactions/fundamentals/10.1587/transfun.E100.A.304/_p
Copy
@ARTICLE{e100-a_1_304,
author={Changyuan WANG, Daiyuan PENG, Xianhua NIU, Hongyu HAN, },
journal={IEICE TRANSACTIONS on Fundamentals},
title={Optimal Construction of Frequency-Hopping Sequence Sets with Low-Hit-Zone under Periodic Partial Hamming Correlation},
year={2017},
volume={E100-A},
number={1},
pages={304-307},
abstract={In this paper, a new class of low-hit-zone (LHZ) frequency-hopping sequence sets (LHZ FHS sets) is constructed based upon the Cartesian product, and the periodic partial Hamming correlation within its LHZ are studied. Studies have shown that the new LHZ FHS sets are optimal according to the periodic partial Hamming correlation bounds of FHS set, and some known FHS sets are the special cases of this new construction.},
keywords={},
doi={10.1587/transfun.E100.A.304},
ISSN={1745-1337},
month={January},}
Copy
TY - JOUR
TI - Optimal Construction of Frequency-Hopping Sequence Sets with Low-Hit-Zone under Periodic Partial Hamming Correlation
T2 - IEICE TRANSACTIONS on Fundamentals
SP - 304
EP - 307
AU - Changyuan WANG
AU - Daiyuan PENG
AU - Xianhua NIU
AU - Hongyu HAN
PY - 2017
DO - 10.1587/transfun.E100.A.304
JO - IEICE TRANSACTIONS on Fundamentals
SN - 1745-1337
VL - E100-A
IS - 1
JA - IEICE TRANSACTIONS on Fundamentals
Y1 - January 2017
AB - In this paper, a new class of low-hit-zone (LHZ) frequency-hopping sequence sets (LHZ FHS sets) is constructed based upon the Cartesian product, and the periodic partial Hamming correlation within its LHZ are studied. Studies have shown that the new LHZ FHS sets are optimal according to the periodic partial Hamming correlation bounds of FHS set, and some known FHS sets are the special cases of this new construction.
ER -
English
