New Quantum codes from constacyclic codes over a general non-chain ring

Abstract

Let q be a prime power and let R=Fq[u1,u2, ·s, uk]/ fi(ui),uiuj-ujui be a finite non-chain ring, where fi(ui), 1≤ i ≤ k are polynomials, not all linear, which split into distinct linear factors over Fq. We characterize constacyclic codes over the ring R and study quantum codes from these. As an application, some new and better quantum codes, as compared to the best known codes, are obtained. We also prove that the choice of the polynomials fi(ui), 1 ≤ i ≤ k is irrelevant while constructing quantum codes from constacyclic codes over R, it depends only on their degrees. It is shown that there always exists Quantum MDS code [[n,n-2,2]]q for any n with (n,q)≠ 1.

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