On the construction of large local arcs

Abstract

Motivated by the construction of optimal locally repairable codes, we introduce the new finite geometric concept of a local arc which is defined as a collection S of disjoint point sets Si in PG(2,q) such that Si Sj is an arc for any Si, Sj ∈ S. We focus on the upper and lower bounds on the sizes of maximum k-uniform local arcs. For q=pm with p prime, we construct k-uniform local arcs in PG(2,q) of size (qd) where d is between 1.1167 and 1.25 depending only on m. For k=4, this implies the existence of optimal locally repairable codes (LRCs) with minimum distance 6, locality 3, and disjoint repair groups, whose length is superlinear in q--a significant improvement over the previously known O(q) constructions for such LRCs.