Construction of full diversity $D_n$-lattices for all $n$

Robson R. de Araujo, Grasiele C. Jorge

Published 2017-09-16Version 1

In this paper we construct some families of rotated $D_n$-lattices with full diversity for any $n$. These lattices can be good for signal transmission over both Gaussian and Rayleigh fading channels. In order to get bounds for their minimum product distances, we show that the $Z$-modules used in \cite{sethoggier} to obtain rotated $\mathbb{Z}^{n}$-lattices with $n$ odd are ideals and find a sufficient condition for such ideals being principal ideals.