Composition of Gray Isometries

Abstract

In classical coding theory, Gray isometries are usually defined as mappings between finite Frobenius rings, which include the ring Zm of integers modulo m, and the finite fields. In this paper, we derive an isometric mapping from Z8 to Z42 from the composition of the Gray isometries on Z8 and on Z42. The image under this composition of a Z8-linear block code of length n with homogeneous distance d is a (not necessarily linear) quaternary block code of length 2n with Lee distance d.