Finite-Blocklength Analysis of Alamouti Codes over Eisenstein Integers

Abstract

We study a space--time block code from a maximal order in the definite quaternion algebra (-1,-3). Its embedding into 2× 2 yields an Alamouti--Eisenstein code over [w] with full diversity, orthogonality, and non-vanishing determinant. The underlying lattice is isomorphic to [w]2, while the embedded lattice has A2 A2 geometry, yielding a hexagonal shaping gain. We compare it with the classical Alamouti code over [i] in terms of shaping, constellation-constrained mutual information, and finite-blocklength achievable rates, obtaining an asymptotic energy gain of about 0.79~dB and a small but positive mutual-information gain. At the same SNR and rate, the Alamouti--Eisenstein design also improves short-packet reliability.