-
- SHEN Lin-Zhi
- College of Science, Civil Aviation University of China
-
- WANG Yu-Jie
- College of Science, Civil Aviation University of China
抄録
<p>For an [n, k, d] (r, δ)-locally repairable codes ((r, δ)-LRCs), its minimum distance d satisfies the Singleton-like bound. The construction of optimal (r, δ)-LRC, attaining this Singleton-like bound, is an important research problem in recent years for thier applications in distributed storage systems. In this letter, we use Reed-Solomon codes to construct two classes of optimal (r, δ)-LRCs. The optimal LRCs are given by the evaluations of multiple polynomials of degree at most r - 1 at some points in 𝔽q. The first class gives the [(r + δ - 1)t, rt - s, δ + s] optimal (r, δ)-LRC over 𝔽q provided that r + δ + s - 1≤q, s≤δ, s<r, and any positive t. The code length is unbounded. The second class gives the [r + r' + d + δ - 2, r + r', d] optimal (r, δ)-LRC over 𝔽q provided that r - r'≥d - δ and r + d - 1≤q + 1, which will produce optimal (r, δ)-LRCs with large minimum distance.</p>
収録刊行物
-
- IEICE Transactions on Fundamentals of Electronics, Communications and Computer Sciences
-
IEICE Transactions on Fundamentals of Electronics, Communications and Computer Sciences E106.A (12), 1589-1592, 2023-12-01
一般社団法人 電子情報通信学会
- Tweet
キーワード
詳細情報 詳細情報について
-
- CRID
- 1390016880929175424
-
- ISSN
- 17451337
- 09168508
-
- 本文言語コード
- en
-
- データソース種別
-
- JaLC
- Crossref
-
- 抄録ライセンスフラグ
- 使用不可