Repairing Reed-Solomon Codes Evaluated on Subspaces
Abstract
We consider the repair problem for Reed--Solomon (RS) codes, evaluated on an -linear subspace of dimension , where is a prime power, is a positive integer, and is the Galois field of size . For the case of , we show the existence of a linear repair scheme for the RS code of length and codimension , , evaluated on , in which each of the surviving nodes transmits only symbols of , provided that . For the case of , we prove a similar result, with some restrictions on the evaluation linear subspace . Our proof is based on a probabilistic argument, however the result is not merely an existence result; the success probability is fairly large (at least ) and there is a simple criterion for checking the validity of the randomly chosen linear repair scheme. Our result extend the construction of Dau--Milenkovich to the range , for a wide range of parameters.
Keywords
Cite
@article{arxiv.2012.11166,
title = {Repairing Reed-Solomon Codes Evaluated on Subspaces},
author = {Amit Berman and Sarit Buzaglo and Avner Dor and Yaron Shany and Itzhak Tamo},
journal= {arXiv preprint arXiv:2012.11166},
year = {2020}
}