Binary Codes with Locality for Multiple Erasures Having Short Block Length

Abstract

The focus of this paper is on linear, binary codes with locality having locality parameter r, that are capable of recovering from t≥ 2 erasures and that moreover, have short block length. Both sequential and parallel (through orthogonal parity checks) recovery is considered here. In the case of parallel repair, minimum-block-length constructions for general t are discussed. In the case of sequential repair, the results include (a) extending and characterizing minimum-block-length constructions for t=2, (b) providing improved bounds on block length for t=3 as well as a general construction for t=3 having short block length, (c) providing short-block-length constructions for general r,t and (d) providing high-rate constructions for r=2 and t in the range 4 ≤ t ≤7. Most of the constructions provided are of binary codes.