The constructions of Singleton-optimal locally repairable codes with minimum distance 6 and locality 3

Abstract

In this paper, we present new constructions of q-ary Singleton-optimal locally repairable codes (LRCs) with minimum distance d=6 and locality r=3, based on combinatorial structures from finite geometry. By exploiting the well-known correspondence between a complete set of mutually orthogonal Latin squares (MOLS) of order q and the affine plane AG(2,q), We systematically construct families of disjoint 4-arcs in the projective plane PG(2,q), such that the union of any two distinct 4-arcs forms an 8-arc. These 4-arcs form what we call 4-local arcs, and their existence is equivalent to that of the desired codes. For any prime power q 7, our construction yields codes of length n = 2q, 2q-2, or 2q-6 depending on whether q is even, q 3 4, or q 1 4, respectively.