Optimal rate-diversity tradeoff STBCs from codes over arbitrary finite fields

Abstract

A linear rank-distance code is a set of matrices over a finite field F/sub q/, with the rank over Fq as a distance metric. A Space-time Block Code (STBC) is a finite set of complex matrices with the rank over the complex field as a metric. Rank-distance codes over prime fields F/sub p/ have found applications as space-time codes. In this paper, we extend this result to arbitrary finite fields by providing an isomorphism from F/sub q/ (q = p/sup m/) to a subset of the ring of integers of an appropriate number field. Using this map and a maximal rank-distance code over F/sub q/, we construct STBC that achieve optimal rate-diversity tradeoff for any given diversity order. Simulation results confirm the diversity gain obtained using these codes.