A family of constacyclic codes over F2m+uF2m and its application to quantum codes

Abstract

We introduce a Gray map from F2m+uF2m to F22m and study (1+u)-constacyclic codes over F2m+uF2m, where u2=0. It is proved that the image of a (1+u)-constacyclic code length n over F2m+uF2m under the Gray map is a distance-invariant quasi-cyclic code of index m and length 2mn over F2. We also prove that every code of length 2mn which is the Gray image of cyclic codes over F2m+uF2m of length n is permutation equivalent to a binary quasi-cyclic code of index m. Furthermore, a family of quantum error-correcting codes obtained from the Calderbank-Shor-Steane (CSS) construction applied to (1+u)-constacyclic codes over F2m+uF2m.