Maximal orders in the design of dense space-time lattice codes

Camilla Hollanti*, Jyrki Lahtonen, Hsiao Feng Lu

*Corresponding author for this work

Research output: Contribution to journalArticleScientificpeer-review

28 Citations (Scopus)

Abstract

In this paper, we construct explicit rate-one, full-diversity, geometrically dense matrix lattices with large, nonvanishing determinants (NVDs) for four transmit antenna multiple-input-single-output (MISO) space-time (ST) applications. The constructions are based on the theory of rings of algebraic integers and related subrings of the Hamiltonian quaternions and can be extended to a larger number of Tx antennas. The usage of ideals guarantees an NVD larger than one and an easy way to present the exact proofs for the minimum determinants. The idea of finding denser sublattices within a given division algebra is then generalized to a multiple-input-multiple-output (MIMO) case with an arbitrary number of Tx antennas by using the theory of cyclic division algebras (CDAs) and maximal orders. It is also shown that the explicit constructions in this paper all have a simple decoding method based on sphere decoding. Related to the decoding complexity, the notion of sensitivity is introduced, and experimental evidence indicating a connection between sensitivity, decoding complexity, and performance is provided. Simulations in a quasi-static Rayleigh fading channel show that our dense quaternionic constructions outperform both the earlier rectangular lattices and the rotated quasi-orthogonal ABBA lattice as well as the diagonal algebraic space-time (DAST) lattice. We also show that our quaternionic lattice is better than the DAST lattice in terms of the diversity-multiplexing gain tradeoff (DMT).

Original languageEnglish
Pages (from-to)4493-4510
Number of pages18
JournalIEEE Transactions on Information Theory
Volume54
Issue number10
DOIs
Publication statusPublished - 2008
MoE publication typeA1 Journal article-refereed

Keywords

  • Algebra
  • Construction industry
  • Cyclic division algebras (CDAs)
  • Decoding
  • Dense lattices
  • Gain
  • Indexes
  • Lattices
  • Maximal orders
  • Multiple-input-multiple-output (MIMO) channels
  • Multiple-input-single-output (MISO) channels
  • Number fields
  • Quaternions
  • Space-time block codes (STBCs)
  • Sphere decoding

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