Error-Erasure Decoding of Linearized Reed-Solomon Codes in the Sum-Rank Metric

Abstract

Codes in the sum-rank metric have various applications in error control for multishot network coding, distributed storage and code-based cryptography. Linearized Reed-Solomon (LRS) codes contain Reed-Solomon and Gabidulin codes as subclasses and fulfill the Singleton-like bound in the sum-rank metric with equality. We propose the first known error-erasure decoder for LRS codes to unleash their full potential for multishot network coding. The presented syndrome-based Berlekamp-Massey-like error-erasure decoder can correct tF full errors, tR row erasures and tC column erasures up to 2tF + tR + tC ≤ n-k in the sum-rank metric requiring at most O(n2) operations in Fqm, where n is the code's length and k its dimension. We show how the proposed decoder can be used to correct errors in the sum-subspace metric that occur in (noncoherent) multishot network coding.