Constructions of Augmented Orthogonal Arrays

Abstract

Augmented orthogonal arrays (AOAs) were introduced by Stinson, who showed the equivalence between ideal ramp schemes and augmented orthogonal arrays (Discrete Math. 341 (2018), 299-307). In this paper, we show that there is an AOA(s,t,k,v) if and only if there is an OA(t,k,v) which can be partitioned into vt-s subarrays, each being an OA(s,k,v), and that there is a linear AOA(s,t,k,q) if and only if there is a linear maximum distance separable (MDS) code of length k and dimension t over Fq which contains a linear MDS subcode of length k and dimension s over Fq. Some constructions for AOAs and some new infinite classes of AOAs are also given.