(1+2u)-constacyclic codes over Z4+uZ4

Abstract

Let R=Z4+uZ4, where Z4 denotes the ring of integers modulo 4 and u2=0. In the present paper, we introduce a new Gray map from Rn to Z42n. We study (1+2u)-constacyclic codes over R of odd lengths with the help of cyclic codes over R. It is proved that the Gray image of (1+2u)-constacyclic codes of length n over R are cyclic codes of length 2n over Z4. Further, a number of linear codes over Z4 as the images of (1+2u)-constacyclic codes over R are obtained.