New quantum codes from constacyclic codes over finite chain rings

Abstract

Let R be the finite chain ring Fp2m+uFp2m, where Fp2m is the finite field with p2m elements, p is a prime, m is a non-negative integer and u2=0. In this paper, we firstly define a class of Gray maps, which changes the Hermitian self-orthogonal property of linear codes over F22m+uF22m into the Hermitian self-orthogonal property of linear codes over F22m. Applying the Hermitian construction, a new class of 2m-ary quantum codes are obtained from Hermitian constacyclic self-orthogonal codes over F22m+uF22m. We secondly define another class of maps, which changes the Hermitian self-orthogonal property of linear codes over R into the trace self-orthogonal property of linear codes over Fp2m. Using the Symplectic construction, a new class of pm-ary quantum codes are obtained from Hermitian constacyclic self-orthogonal codes over R.