Locally recoverable codes from automorphism groups of function fields of genus g ≥ 1

Abstract

A Locally Recoverable Code is a code such that the value of any single coordinate of a codeword can be recovered from the values of a small subset of other coordinates. When we have δ non overlapping subsets of cardinality ri that can be used to recover the missing coordinate we say that a linear code C with length n, dimension k, minimum distance d has (r1,…, rδ)-locality and denote it by [n, k, d; r1, r2,…, rδ]. In this paper we provide a new upper bound for the minimum distance of these codes. Working with a finite number of subgroups of cardinality ri+1 of the automorphism group of a function field F| Fq of genus g ≥ 1, we propose a construction of [n, k, d; r1, r2,…, rδ]-codes and apply the results to some well known families of function fields.