New quantum codes from dual-containing cyclic codes over finite rings

Abstract

Let R=F2m+uF2m+·s+ukF2m , where F2m is a finite field with 2m elements, m is a positive integer, u is an indeterminate with uk+1=0. In this paper, we propose the constructions of two new families of quantum codes obtained from dual-containing cyclic codes of odd length over R. A new Gray map over R is defined and a sufficient and necessary condition for the existence of dual-containing cyclic codes over R is given. A new family of 2m-ary quantum codes is obtained via the Gray map and the Calderbank-Shor-Steane construction from dual-containing cyclic codes over R. Furthermore, a new family of binary quantum codes is obtained via the Gray map, the trace map and the Calderbank-Shor-Steane construction from dual-containing cyclic codes over R.