1989
DOI: 10.1109/18.30982
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Optical orthogonal codes: design, analysis and applications

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Cited by 1,020 publications
(586 citation statements)
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“…(u, s) = (8, 1) : (6,3), (3, ∞)}, {(0, 0), (6, 5), (7, ∞)}, {(0, 0), (7, 1), (4, ∞)}, {(0, 0), (7, 2), (5, ∞)}, {(0, 0), (7,4) 1), (5, 2), (1, ∞)}, {(0, 1), (6, 2), (7, ∞)}, {(0, 1), (6, 3), (4, ∞)}, {(0, 1), (7, 2), (6, ∞)}, {(0, 1), (7,5) (4,4), (0, a)}, {(4, 5), (6, 0), (0, a)}, {(5, 0), (7,5), (0, a)}, {(5, 2), (7,3), (0, a)}, {(5, 3), (6, 1), (0, a)}, {(5, 4), (6, 2), (0, a)}, {(5, 5), (7,4), (0, a)}, {(6, 3), (7, 0), (0, a)}, {(6, 4), (7,1), (0, a)}, {(6, 5), (7,2) (4,3), (0, e)}, {(1, 1), (5, 3), (0, e)}, {(1, 2), (5, 5), (0, e)}, {(1, 3), (4, 0), (0, e)}, {(1, 4), (6, 0), (0, e)}, {(1, 5), (5, 4), (0, e)}, {(2, 0), (6, 1), (0, e)}, {(2, 1), (5, 2), (0, e)}, {(2, 2), (5, 1), (0, e)}, {(2, 3), (6, 2), (0, e)}, {(2, 4), (5, 0), (0, e)}, {(2, 5), (4, 2), (0, e)}, {(3, 0), (7, 2), (0, e)}, {(3, 1), (6, 4), (0, e)}, {(3, 2), (6, 5), (0, e)}, {(3, 3), (7,4), (0, e)}, {(3, 4), (7, 0), (0, e)}, {(3, 5), (7,3), (0, e)}, {(4, 1), (7,5), (0, e)}, {(4, 4), (7, 1), (0, e)}, {(4, 5), (6,3) {(0, 0), (7, 2), (13, 5)}, {(0, 0), (7,4), (2, ∞)}, {(0, 0), (8, 2), (10, 5)}, {(0, 0), (9,5), (6, ∞)}, {(0, 0), (10, 2), (11, 1)}, {(0, 0), (11,2), (9, ∞)}, {(0, 0), (11,3), (8, ∞)}, {(0, 0), (11,5), (7, ∞)}, {(0, 0), (12...…”
Section: The Case Of U ≡ 2 (Mod 6)mentioning
confidence: 99%
See 1 more Smart Citation
“…(u, s) = (8, 1) : (6,3), (3, ∞)}, {(0, 0), (6, 5), (7, ∞)}, {(0, 0), (7, 1), (4, ∞)}, {(0, 0), (7, 2), (5, ∞)}, {(0, 0), (7,4) 1), (5, 2), (1, ∞)}, {(0, 1), (6, 2), (7, ∞)}, {(0, 1), (6, 3), (4, ∞)}, {(0, 1), (7, 2), (6, ∞)}, {(0, 1), (7,5) (4,4), (0, a)}, {(4, 5), (6, 0), (0, a)}, {(5, 0), (7,5), (0, a)}, {(5, 2), (7,3), (0, a)}, {(5, 3), (6, 1), (0, a)}, {(5, 4), (6, 2), (0, a)}, {(5, 5), (7,4), (0, a)}, {(6, 3), (7, 0), (0, a)}, {(6, 4), (7,1), (0, a)}, {(6, 5), (7,2) (4,3), (0, e)}, {(1, 1), (5, 3), (0, e)}, {(1, 2), (5, 5), (0, e)}, {(1, 3), (4, 0), (0, e)}, {(1, 4), (6, 0), (0, e)}, {(1, 5), (5, 4), (0, e)}, {(2, 0), (6, 1), (0, e)}, {(2, 1), (5, 2), (0, e)}, {(2, 2), (5, 1), (0, e)}, {(2, 3), (6, 2), (0, e)}, {(2, 4), (5, 0), (0, e)}, {(2, 5), (4, 2), (0, e)}, {(3, 0), (7, 2), (0, e)}, {(3, 1), (6, 4), (0, e)}, {(3, 2), (6, 5), (0, e)}, {(3, 3), (7,4), (0, e)}, {(3, 4), (7, 0), (0, e)}, {(3, 5), (7,3), (0, e)}, {(4, 1), (7,5), (0, e)}, {(4, 4), (7, 1), (0, e)}, {(4, 5), (6,3) {(0, 0), (7, 2), (13, 5)}, {(0, 0), (7,4), (2, ∞)}, {(0, 0), (8, 2), (10, 5)}, {(0, 0), (9,5), (6, ∞)}, {(0, 0), (10, 2), (11, 1)}, {(0, 0), (11,2), (9, ∞)}, {(0, 0), (11,3), (8, ∞)}, {(0, 0), (11,5), (7, ∞)}, {(0, 0), (12...…”
Section: The Case Of U ≡ 2 (Mod 6)mentioning
confidence: 99%
“…A one-dimensional (1-D) optical orthogonal code (1-D OOC) is a set of binary sequences having good auto and cross-correlations. 1-D OOCs were first suggested by [7] in 1989. Since then there are many researches on 1-D OOCs (see, e.g., [2,3,5,12,14,18,19,26]).…”
Section: Introductionmentioning
confidence: 99%
“…In terms of cost, spectral amplitude coding network (SAC) is very attractive because there are no active components in the transmission line. Several optical orthogonal codes (OOCs) families have been proposed for various OCDMA technologies: spectral-amplitude-coding (SAC) [3,4]; and time-spreading encoding [5]. However, these codes suffer from various limitations one way or another.…”
Section: Introductionmentioning
confidence: 99%
“…The focus on the development of OCDMA systems is to improve the cardinality, mitigate PIIN (Phase Induced Intensity Noise), as well as suppress MAI (Multiplied Access Inference). Many schemes has been proposed in accordance in the OCDMA system detection such as, frequency hopping [1,2], the time spreading [3][4], spectral amplitude coding (SAC) [5][6] and code of spatial [7]. To have a good OCDMA detection of a code sequence should have the minimum cross-correlation and maximum auto-correlation properties for maintenance.…”
Section: Introductionmentioning
confidence: 99%