Codes With Locality for Two Erasures

Prakash, N. ; Lalitha, V. ; Balaji, S. B. ; Vijay Kumar, P. (2019) Codes With Locality for Two Erasures IEEE Transactions on Information Theory, 65 (12). pp. 7771-7789. ISSN 0018-9448

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Official URL: http://doi.org/10.1109/TIT.2019.2934124

Related URL: http://dx.doi.org/10.1109/TIT.2019.2934124

Abstract

Codes with locality are a class of codes introduced by Gopalan et al. to efficiently repair a failed node, by minimizing the number of nodes contacted during repair. An [n,k] systematic code is said to have information locality r , if each message symbol can be recovered by accessing ≤r other symbols. An [n,k] code is said to have all-symbol locality r , if each code symbol can be recovered by accessing ≤r other symbols. In this paper, we consider a generalization of codes with all-symbol locality to the case of handling two erasures. We study codes with locality that can recover from two erasures via a sequence of two local, parity-check computations. We refer to these codes as sequential-recovery locally repairable codes (denoted by 2-seq LR codes). Earlier approaches to handling multiple erasures considered recovery in parallel; the sequential approach allows us to potentially construct codes with improved minimum distance. We derive an upper bound on the rate of 2-seq LR codes. We provide constructions based on regular graphs which are rate-optimal with respect to the derived bound. We also characterize the structure of any rate-optimal code. By studying the Generalized Hamming Weights of the dual code, we derive a recursive upper bound on the minimum distance of 2-seq LR codes. We also provide constructions of a family of codes based on Turán graphs, that are optimal with respect to this bound. We also present explicit distance-optimal Turán graph based constructions of 2-seq LR codes for certain parameters. Our approach also leads to a new bound on the minimum distance of codes with all-symbol locality for the single-erasure case.

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Deposited On:17 Nov 2021 09:34
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