A COMPLETE STRUCTURE OF SKEW CYCLIC CODES OVER Z4 + uZ4

In this paper, we study a class of skew cyclic codes over the ring R = Z(4) + uZ(4), with u(2) = 1. We determine a complete structure of skew cyclic codes over R by investigating the generating sets of these codes. Additionally, we have identified some more conditions on generating polynomials for these codes when dealing with odd lengths, and in this case, the skew-cyclic codes are equivalent to cyclic codes. Some examples have been given to illustrate the results. Moreover, we present some examples of skew cyclic codes over R whose Z(4) images give some new linear codes over Z(4).