Galois hulls of constacyclic codes over affine algebra rings

Abstract

Let A the affine algebra given by the ring Fq[X1,X2,…,X]/ I, where I is the ideal t1(X1), t2(X2), …, t(X) with each ti(Xi), 1≤ i≤ , being a square-free polynomial over Fq. This paper studies the k-Galois hulls of λ-constacyclic codes over A regarding their idempotent generators. For this, first, we define the k-Galois inner product over A and find the form of the generators of the k-Galois dual and the k-Galois hull of a λ-constacyclic code over A. Then, we derive a formula for the k-Galois hull dimension of a λ-constacyclic code. Further, we provide a condition for a λ-constacyclic code to be k-Galois LCD. Finally, we give some examples of the use of these codes in constructing entanglement-assisted quantum error-correcting codes.

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