On the Locality of Codeword Symbols

Gopalan, Parikshit; Huang, Cheng; Simitci, Huseyin; Yekhanin, Sergey

doi:10.1109/tit.2012.2208937

Cited by 750 publications

(1,086 citation statements)

References 16 publications

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“…t þ 1, note that there are t ¼ eðm À þ 1Þ polynomials that contain the common term x q À1 as shown in (1). Each of these polynomials corresponds to a row in a parity check matrix of a one-step majority-logic decodable code [4].…”

Section: Theoremmentioning

confidence: 99%

“…Locally repairable codes (LRCs) [1,2] have recently attracted considerable attention as a promising technology for data protection. An ðr; tÞ-LRC is a code having the following property: each coordinate of codewords can be recovered from at most r other coordinates (called a repair set), and there are at least t disjoint repair sets for each coordinate, where r and t are called locality and availability, respectively [3].…”

Section: Introductionmentioning

confidence: 99%

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Generalized construction of cyclic (r, t)-locally repairable codes using trace function

Pham

Yagi

2017

IEICE ComEX

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With an increasing demand for distributed systems storing big data, locally repairable codes (LRCs) have attracted attentions to recover lost data on failure nodes. An (r, t)-LRC has the property that each coordinate of codewords can be recovered from at most r other coordinates (repair set), and there are at least t disjoint repair sets for each coordinate, where r and t are called locality and availability, respectively. Wang, Zhang, and Lin recently have proposed a construction method of cyclic (r, t)-LRCs that can have high availability with a guaranteed lower bound on the minimum distance. However, due to the lack of flexibility in code design, it is impossible to modify code parameters while keeping the code performance. This letter presents a generalized construction of cyclic (r, t)-LRCs based on the trace function whose high-degree terms are truncated. It is shown that the proposed construction preserves the symbol-repairing performance and therefore provides better flexibility in code design.

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Section: Theoremmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Generalized construction of cyclic (r, t)-locally repairable codes using trace function

Pham

Yagi

2017

IEICE ComEX

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“…분산 저장 부호화 방법의 성능을 평가하는 중요한 지표 중 하나인 부분접속수(locality) [2] 는 임의의 손실 된 노드를 복구하기 위하여 접속해야 하는 최소 노드 의 수를 의미한다. 부분접속수의 이론적 한계식 [2] 이 제시된 이후 부분접속 복구 부호에 대한 연구와 좀 더 일반화된 부분접속수에 대한 연구가 활발히 진행되고 있다 [3][4][5][6][7][8][9][10][11] .…”

Section: 여 저장 노드들 중 일부가 손실되는 경우가 빈번히 발 생한다 이와 같은 저장 노드의 손실에 대응하기 위하 unclassified

“…부분접속수의 이론적 한계식 [2] 이 제시된 이후 부분접속 복구 부호에 대한 연구와 좀 더 일반화된 부분접속수에 대한 연구가 활발히 진행되고 있다 [3][4][5][6][7][8][9][10][11] . 특히 최근 임의의 노드 개가 손실된 경우 손실된 개의 노드들을 복구하기 위하여 이용되어야 하는 최소 노드의 개수를 -부분접속수(  )로 정의하 고, -부분접속수를 만족하는 부호 설계에 대한 연구 가 발표되었다 [11] .…”

Section: 여 저장 노드들 중 일부가 손실되는 경우가 빈번히 발 생한다 이와 같은 저장 노드의 손실에 대응하기 위하 unclassified

Binary Locally Repairable Codes from Complete Multipartite Graphs

Kim

Nam

Song

2015

The Journal of Korean Institute of Communications and Informati

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This paper introduces a generalized notion, referred to as joint locality, of the usual locality in distributed storage systems and proposes a code construction of binary locally repairable codes with joint locality          . Joint locality is a set of numbers of nodes for repairing various failure patterns of nodes.The proposed scheme simplifies the code design problem utilizing complete multipartite graphs. Moreover, our construction can generate binary locally repairable codes achieving  -availability for any positive integer . It means that each node can be repaired by  disjoint repair sets of cardinality 2. This property is useful for distributed storage systems since it permits parallel access to hot data.

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“…This property is desirable in distributed storage systems and was introduced in that context in [7].…”

Section: Introductionmentioning

confidence: 99%

Local recovery properties of capacity achieving codes

Mazumdar

Chandar

Wornell

2013

2013 Information Theory and Applications Workshop (ITA)

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Abstract-A code is called locally recoverable or repairable if any symbol of a codeword can be recovered by reading only a small (constant) number of other symbols. The notion of local recoverability is important in the area of distributed storage where a most frequent error-event is a single storage node failure. A common objective is to repair the node by downloading data from as few other storage node as possible.In this paper we study the basic error-correcting properties of a locally recoverable code. We provide tight upper and lower bound on the local-recoverability of a code that achieves capacity of a symmetric channel. In particular it is shown that, if the coderate is less than the capacity then for the optimal codes, the maximum number of codeword symbols required to recover one lost symbol must scale as log 1 .

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On the Locality of Codeword Symbols

Cited by 750 publications

References 16 publications

Generalized construction of cyclic (<i>r</i>, <i>t</i>)-locally repairable codes using trace function

Generalized construction of cyclic (<i>r</i>, <i>t</i>)-locally repairable codes using trace function

Binary Locally Repairable Codes from Complete Multipartite Graphs

Local recovery properties of capacity achieving codes

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