New optimal $(v, \{3,5\}, 1, Q)$ optical orthogonal codes | Zendy

Huangsheng Yu | Zendy; Dianhua Wu | Zendy; Jinhua Wang | Zendy

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New optimal $(v, \{3,5\}, 1, Q)$ optical orthogonal codes

Author(s) -

Huangsheng Yu,

Dianhua Wu,

Jinhua Wang

Publication year - 2016

Publication title -

advances in mathematics of communications

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.601

H-Index - 26

eISSN - 1930-5346

pISSN - 1930-5338

DOI - 10.3934/amc.2016042

Subject(s) - mathematics , congruence (geometry) , code division multiple access , discrete mathematics , combinatorics , telecommunications , computer science , geometry

Variable-weight optical orthogonal code (OOC) was introduced by Yang for multimedia optical CDMA systems with multiple quality of service (QoS) requirements. It is proved that optimal $(v, \{3, 5\}, 1, (1/2, 1/2))$-OOCs exist for some complete congruence classes of $v$. In this paper, for $Q\in \{(2/3,1/3), (3/4,1/4)\}$, by using skew starters, it is also proved that optimal $(v, \{3,5\}, 1, Q)$-OOCs exist for some complete congruence classes of $v$.

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