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
O código ortogonal óptico de peso variável (OOC) foi introduzido por GC Yang para sistemas CDMA ópticos multimídia com múltiplos requisitos de qualidade de serviço (QoS). Neste artigo, uma construção para ótimo (υ, {3,4}, 1, {s/(s+1), 1/(s+1)})-OOCs é fornecido. Para s=2, está provado que para cada primo υ≡ 1(mod 24), existe um (υ, {3,4}, 1, {2/3, 1/3})-OOC. Uma construção recursiva para família de diferenças cíclicas também é apresentada. Ao usar essas construções, uma série de novas classes infinitas de ótimos (υ, {3,4}, 1, Q)-OOCs para Q = {1/2, 1/2} e {2/3, 1/3} são construídos.
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Dianhua WU, Pingzhi FAN, Xun WANG, Minquan CHENG, "New Classes of Optimal Variable-Weight Optical Orthogonal Codes Based on Cyclic Difference Families" in IEICE TRANSACTIONS on Fundamentals,
vol. E93-A, no. 11, pp. 2232-2238, November 2010, doi: 10.1587/transfun.E93.A.2232.
Abstract: Variable-weight optical orthogonal code (OOC) was introduced by G-C Yang for multimedia optical CDMA systems with multiple quality of service (QoS) requirement. In this paper, a construction for optimal (υ, {3,4}, 1, {s/(s+1), 1/(s+1)})-OOCs is given. For s=2, it is proved that for each prime υ≡ 1(mod 24), there exists a (υ, {3,4}, 1, {2/3, 1/3})-OOC. A recursive construction for cyclic difference family is also presented. By using these constructions, a number of new infinite classes of optimal (υ, {3,4}, 1, Q)-OOCs for Q = {1/2, 1/2} and {2/3, 1/3} are constructed.
URL: https://global.ieice.org/en_transactions/fundamentals/10.1587/transfun.E93.A.2232/_p
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@ARTICLE{e93-a_11_2232,
author={Dianhua WU, Pingzhi FAN, Xun WANG, Minquan CHENG, },
journal={IEICE TRANSACTIONS on Fundamentals},
title={New Classes of Optimal Variable-Weight Optical Orthogonal Codes Based on Cyclic Difference Families},
year={2010},
volume={E93-A},
number={11},
pages={2232-2238},
abstract={Variable-weight optical orthogonal code (OOC) was introduced by G-C Yang for multimedia optical CDMA systems with multiple quality of service (QoS) requirement. In this paper, a construction for optimal (υ, {3,4}, 1, {s/(s+1), 1/(s+1)})-OOCs is given. For s=2, it is proved that for each prime υ≡ 1(mod 24), there exists a (υ, {3,4}, 1, {2/3, 1/3})-OOC. A recursive construction for cyclic difference family is also presented. By using these constructions, a number of new infinite classes of optimal (υ, {3,4}, 1, Q)-OOCs for Q = {1/2, 1/2} and {2/3, 1/3} are constructed.},
keywords={},
doi={10.1587/transfun.E93.A.2232},
ISSN={1745-1337},
month={November},}
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TY - JOUR
TI - New Classes of Optimal Variable-Weight Optical Orthogonal Codes Based on Cyclic Difference Families
T2 - IEICE TRANSACTIONS on Fundamentals
SP - 2232
EP - 2238
AU - Dianhua WU
AU - Pingzhi FAN
AU - Xun WANG
AU - Minquan CHENG
PY - 2010
DO - 10.1587/transfun.E93.A.2232
JO - IEICE TRANSACTIONS on Fundamentals
SN - 1745-1337
VL - E93-A
IS - 11
JA - IEICE TRANSACTIONS on Fundamentals
Y1 - November 2010
AB - Variable-weight optical orthogonal code (OOC) was introduced by G-C Yang for multimedia optical CDMA systems with multiple quality of service (QoS) requirement. In this paper, a construction for optimal (υ, {3,4}, 1, {s/(s+1), 1/(s+1)})-OOCs is given. For s=2, it is proved that for each prime υ≡ 1(mod 24), there exists a (υ, {3,4}, 1, {2/3, 1/3})-OOC. A recursive construction for cyclic difference family is also presented. By using these constructions, a number of new infinite classes of optimal (υ, {3,4}, 1, Q)-OOCs for Q = {1/2, 1/2} and {2/3, 1/3} are constructed.
ER -