1. Construction of New Fractional Repetition Codes from Relative Difference Sets with λ = 1.
- Author
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Young-Sik Kim, Hosung Park, and Jong-Seon No
- Subjects
- *
GALOIS theory , *INTEGERS , *DIFFERENCE sets , *BANDWIDTH allocation , *DIFFERENTIAL equations - Abstract
Fractional repetition (FR) codes are a class of distributed storage codes that replicate and distribute information data over several nodes for easy repair, as well as efficient reconstruction. In this paper, we propose three new constructions of FR codes based on relative difference sets (RDSs) with λ = 1. Specifically, we propose new (q² - 1, q, q) FR codes using cyclic RDS with parameters (q + 1, q - 1, q, 1) constructed from q-ary m-sequences of period q²-1 for a prime power q, (p², p, p) FR codes using non-cyclic RDS with parameters (p, p, p, 1) for an odd prime p or p = 4 and (4l, 2l, 2l,1) constructed from the Galois ring for a positive integer l. They are differentiated from the existing FR codes with respect to the constructable code parameters. It turns out that the proposed FR codes are (near) optimal for some parameters in terms of the FR capacity bound. Especially, (8, 3, 3) and (9, 3, 3) FR codes are optimal, that is, they meet the FR capacity bound for all k. To support various code parameters, we modify the proposed (q² - 1, q, q) FR codes using decimation by a factor of the code length q² - 1, which also gives us new good FR codes. [ABSTRACT FROM AUTHOR]
- Published
- 2017
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