On the Structure of Higher Order MDS Codes

Abstract

A code of length n is said to be (combinatorially) (,L)-list decodable if the Hamming ball of radius n around any vector in the ambient space does not contain more than L codewords. We study a recently introduced class of higher order MDS codes, which are closely related (via duality) to codes that achieve a generalized Singleton bound for list decodability. For some ≥ 1, higher order MDS codes of length n, dimension k, and order are denoted as (n,k)-MDS() codes. We present a number of results on the structure of these codes, identifying the `extend-ability' of their parameters in various scenarios. Specifically, for some parameter regimes, we identify conditions under which (n1,k1)-MDS(1) codes can be obtained from (n2,k2)-MDS(2) codes, via various techniques. We believe that these results will aid in efficient constructions of higher order MDS codes. We also obtain a new field size upper bound for the existence of such codes, which arguably improves over the best known existing bound, in some parameter regimes.