English

Erasure codes with symbol locality and group decodability for distributed storage

Information Theory 2015-07-30 v2 math.IT

Abstract

We introduce a new family of erasure codes, called group decodable code (GDC), for distributed storage system. Given a set of design parameters {\alpha; \beta; k; t}, where k is the number of information symbols, each codeword of an (\alpha; \beta; k; t)-group decodable code is a t-tuple of strings, called buckets, such that each bucket is a string of \beta symbols that is a codeword of a [\beta; \alpha] MDS code (which is encoded from \alpha information symbols). Such codes have the following two properties: (P1) Locally Repairable: Each code symbol has locality (\alpha; \beta-\alpha + 1). (P2) Group decodable: From each bucket we can decode \alpha information symbols. We establish an upper bound of the minimum distance of (\alpha; \beta; k; t)-group decodable code for any given set of {\alpha; \beta; k; t}; We also prove that the bound is achievable when the coding field F has size |F| > n-1 \choose k-1.

Keywords

Cite

@article{arxiv.1502.00842,
  title  = {Erasure codes with symbol locality and group decodability for distributed storage},
  author = {Wentu Song and Son Hoang Dau and Chau Yuen},
  journal= {arXiv preprint arXiv:1502.00842},
  year   = {2015}
}

Comments

9 pages

R2 v1 2026-06-22T08:20:29.402Z