Repairing Reed-Solomon Codes via Subspace Polynomials

Abstract

We propose new repair schemes for Reed-Solomon codes that use subspace polynomials and hence generalize previous works in the literature that employ trace polynomials. The Reed-Solomon codes are over Fq and have redundancy r = n-k ≥ qm, 1≤ m≤ , where n and k are the code length and dimension, respectively. In particular, for one erasure, we show that our schemes can achieve optimal repair bandwidths whenever n=q and r = qm, for all 1 ≤ m ≤ . For two erasures, our schemes use the same bandwidth per erasure as the single erasure schemes, for /m is a power of q, and for =qa, m=qb-1>1 (a ≥ b ≥ 1), and for m≥ /2 when is even and q is a power of two.