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New Constructions of Optimal Locally Repairable Codes With Super-Linear Length

Xiangliang Kong, Xin Wang, Gennian Ge

2021IEEE Transactions on Information Theory24 citationsDOI

Abstract

As an important coding scheme in modern distributed storage systems, locally repairable codes (LRCs) have attracted a lot of attentions from perspectives of both practical applications and theoretical research. As a major topic in the research of LRCs, bounds and constructions of the corresponding optimal codes are of particular concerns. In this work, codes with (r,δ)-locality which have optimal minimal distance w.r.t. the bound given by Prakash et al. are considered. Through parity-check matrix approach, constructions of both optimal (r,δ)-LRCs with all symbol locality ( (r,δ) <sub xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink">a</sub> -LRCs) and optimal (r,δ)-LRCs with information locality ( (r,δ) <sub xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink">i</sub> -LRCs) are provided. As a generalization of a work of Xing and Yuan, these constructions are built on a connection between sparse hypergraphs and optimal (r,δ)-LRCs. With the help of constructions of large sparse hypergraphs, the lengths of codes obtained from our construction can be super-linear in the alphabet size. This improves upon previous constructions when the minimal distance of the code is at least 3δ+1. As two applications, optimal H-LRCs with super-linear lengths and GSD codes with unbounded lengths are also constructed.

Topics & Concepts

LocalityAlphabetUpper and lower boundsDiscrete mathematicsCombinatoricsGeneralizationMathematicsCode (set theory)Minimum distanceCoding (social sciences)Block codeCoding theoryComputer scienceAlgorithmDecoding methodsStatisticsSet (abstract data type)Programming languageMathematical analysisLinguisticsPhilosophyAdvanced Data Storage TechnologiesCaching and Content DeliveryError Correcting Code Techniques