On the Structure of Two-Dimensional Constacyclic Codes using Common Zero Sets

Abstract

We consider two-dimensional (λ1, λ2)-constacyclic codes over Fq of area M N, where q is some power of prime p with (M,p)=1 and (N,p)=1. With the help of common zero (CZ) set, we characterize 2-D constacyclic codes. Further, we provide an algorithm to construct an ideal basis of these codes by using their essential common zero (ECZ) sets. We also describe the dual of 2-D constacyclic codes. Finally, we provide an encoding scheme for generating 2-D constacyclic codes from the generator tensor, implementable in a parallel fashion. Through examples, we illustrate that 2-D constacyclic codes can have better minimum distance compared to their cyclic counterparts with the same code area and code rate, generalizing prior work over 2-D binary cyclic coded arrays.

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