• DocumentCode
    1780333
  • Title

    Shifted inverse determinant sums and new bounds for the DMT of space-time lattice codes

  • Author

    Vehkalahti, R. ; Luzzi, L. ; Belfiore, Jean-Claude

  • Author_Institution
    Dept. of Math. & Stat., Univ. of Turku, Turku, Finland
  • fYear
    2014
  • fDate
    June 29 2014-July 4 2014
  • Firstpage
    2331
  • Lastpage
    2335
  • Abstract
    This paper considers shifted inverse determinant sums arising from the union bound of the pairwise error probability for space-time codes in multiple-antenna fading channels. Previous work by Vehkalahti et al. focused on the approximation of these sums for low multiplexing gains, providing a complete classification of the inverse determinant sums as a function of constellation size for the most well-known algebraic space-time codes. This work aims at building a general framework for the study of the shifted sums for all multiplexing gains. New bounds obtained using dyadic summing techniques suggest that the behavior of the shifted sums does characterize many properties of a lattice code such as the diversity-multiplexing gain trade-off, both under maximum-likelihood decoding and infinite lattice naive decoding. Moreover, these bounds allow to characterize the signal-to-noise ratio thresholds corresponding to different diversity gains.
  • Keywords
    diversity reception; error statistics; fading channels; multiplexing; space-time codes; DMT; diversity-multiplexing gain trade-off; dyadic summing technique; infinite lattice naive decoding; maximum likelihood decoding; multipleantenna fading channel; multiplexing gain shifted sum; pairwise error probability; shifted inverse determinant sum; space-time lattice codes; Decoding; Lattices; Multiplexing; Signal to noise ratio; Space-time codes; Upper bound;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Information Theory (ISIT), 2014 IEEE International Symposium on
  • Conference_Location
    Honolulu, HI
  • Type

    conf

  • DOI
    10.1109/ISIT.2014.6875250
  • Filename
    6875250